Corruption and Competition · Corruption Perception Index, or the CPI, published by the...
Transcript of Corruption and Competition · Corruption Perception Index, or the CPI, published by the...
Corruption and Competition*
Franklin Allen† Jun “QJ” Qian Lin Shen
Imperial College London Shanghai Advanced Institute of Finance Department
[email protected] and Finance The Wharton School
University of Pennsylvania Shanghai Jiao Tong University University of Pennsylvania
[email protected] [email protected] [email protected]
May 17, 2016
Abstract
An interesting aspect of corruption is that its damaging effects on economic performance seem to
differ significantly across countries. In large and regionally diverse countries such as China and
India, rampant corruption has not slowed down economic growth; in many African and South
American countries it seems that corrupt officials severely retard economic development. We
examine corruption associated with the provision of government services and goods. Local officials
can charge a fee to cover the cost of provision. Due to an agency problem, corruption occurs, and
local officials set higher than social optimal fees as bribes. Central government can mitigate the
agency problem by paying for performance financed by tax revenues. However, budget-constrained
central governments have limited power in controlling corruption with such payment schemes. One
possibility is to use the law to try to rule out corruption. However, such attempts often fail. We
argue that a different approach is to combat corruption by introducing competition between officials.
With multiple officials providing the same service or good, the fee is determined competitively, and
the pernicious effects of corruption are minimized. Moreover, the cost of implementing the optimal
payment scheme by the central government is also minimized. This theory is consistent with some
countries growing at fast rates despite corruption while others are severely damaged by it.
Keywords: Corruption, institutions, competition, taxes, user fee.
JEL Classifications: O0; H0; P5.
* We appreciate helpful comments from Viral Acharya, Tim Baldentius, Pierluigi Balduzzi, Hanming Fang, Frank
Gevurtz, Ning Gong, Ed Kane, Andrei Shleifer, Phil Strahan, Shyam Sunder, Yong Wang, Luigi Zingales and
seminar/session participants at Journal of Law Finance and Accounting Conference (Boston), Boston College, China
International Conference in Finance (Chengdu), and the Symposium on “Rethinking Corruption” at the McGeorge
School of Law, University of the Pacific. Jason Xu provided excellent research assistance. Data on country-level
corruption indexes provided by Martha Dye of Transparency International and financial support from Boston College
and the Wharton Financial Institutions Center are gratefully acknowledged. The authors are responsible for all
remaining errors.
† Corresponding author: Franklin Allen, Imperial College Business School, Tanaka Building, South Kensington Campus,
London SW7 2AZ, UK. E-mail: [email protected].
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Corruption and Competition
May 17, 2016
Abstract
An interesting aspect of corruption is that its damaging effects on economic performance seem to
differ significantly across countries. In large and regionally diverse countries such as China and
India, rampant corruption has not slowed down economic growth; in many African and South
American countries it seems that corrupt officials severely retard economic development. We
examine corruption associated with the provision of government services and goods. Local officials
can charge a fee to cover the cost of provision. Due to an agency problem, corruption occurs, and
local officials set higher than social optimal fees as bribes. Central government can mitigate the
agency problem by paying for performance financed by tax revenues. However, budget-constrained
central governments have limited power in controlling corruption with such payment schemes. One
possibility is to use the law to try to rule out corruption. However, such attempts often fail. We
argue that a different approach is to combat corruption by introducing competition between officials.
With multiple officials providing the same service or good, the fee is determined competitively, and
the pernicious effects of corruption are minimized. Moreover, the cost of implementing the optimal
payment scheme by the central government is also minimized. This theory is consistent with some
countries growing at fast rates despite corruption while others are severely damaged by it.
Keywords: Corruption, institutions, competition, taxes, user fee.
JEL Classifications: O0; H0; P5.
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I. Introduction
Corruption has many damaging effects in any economy, including the distortion of
incentives and misallocation of resources, and it occurs in various forms in almost all industries
(e.g., Shleifer and Vishny 1993, Khwaja and Mian 2005). In its worst form, corruption is essentially
outright theft and robbery done on a massive scale by high-ranking government officials. Corruption is
also a pervasive and persistent problem, and takes on many different forms.1 It occurs in many
countries, including some of the most developed ones, and seems very difficult to eradicate.
Despite ample evidence at the micro-level on the prevalence, scale and damaging effects of
corruption, researchers generally do not find a negative and significant relation between corruption,
measured by a number of indexes provided by international organizations (most notably the
Corruption Perception Index, or the CPI, published by the Transparency International), and
economic growth in cross-country studies (e.g., Mauro 1995; Svensson 2005). One reason for this
interesting and perhaps puzzling fact is that these indexes are imperfect measures for the multiple
facets of corruption (e.g., Olken 2009; Gutmann et al. 2015). Another reason is that the negative
effects of corruption on growth differ significantly across countries (e.g., Olken and Pande 2012).
For example, in countries like China and India, rampant corruption has not slowed down growth
(e.g., Allen et al. 2005, 2012); but in many African and South American countries, its effects seem
far more damaging (e.g., Fisman and Svensson 2007).
Why does corruption occur and why is it so difficult to eradicate? How to explain the cross-
country variations on the impact of corruption? In this paper, we address these questions by
focusing on corruption associated with the provision of government services and goods to the public
such as banking licenses, initial public offering approval for firms that want to go public, and many
1 Extrapolating from firm and household survey data, the World Bank estimates that total bribes paid to officials around
the world are about US$1 trillion per year, or 3% of world GDP (Rose-Ackerman 2004). For descriptions on the
severity of corruption in individual countries, see reports from IMF, World Bank and Transparency International.
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other services such as provision of driver’s licenses. We first argue that corruption arises due to an
agency problem. Officials can charge fees to cover the cost of provision. However, the fees charged
cannot be perfectly monitored by the central government, therefore officials have incentive to take
advantage of their market power and charge higher than social optimal user fees. In this regard, we
define bribes as fees paid in excess of the cost of provision and corruption as officials receiving
bribes over and above the costs of supplying the socially optimal level of services and goods. The
central government can reduce corruption by paying bonuses to officials who increase the provision
of services and goods to firms and the public. However, the central government might not have
sufficient tax revenues to implement such costly salary schemes. Even if the government is not
budget-constrained, it would optimally tolerate moderate levels of corruption to save the cost of
such conditional salary payments. This is related to the idea of capitulation wages (e.g. Besley and
McLaren 1993, Gorodnichenko and Peter 2007), which basically means wages are so low that only
corrupt citizens would accept employment as government officials, and this is sometimes more
efficient than paying incentive compatible wages to achieve the social optimum. In the long run,
one way to curtail corruption is to raise more revenues directly through taxes and raise the
sensitivity of payment to performance for officials.
With insufficient tax revenues in the short run, however, can anything be done to minimize
the damaging effects of corruption? Using the legal system to make corruption illegal is one way to
try to prevent corruption. However, the rampant corruption in many countries shows the limitations
of this kind of approach. We argue that if services and goods are provided in a competitive
environment, so that multiple officials compete to provide the same service or good (e.g., issuing
licenses for banks), then the pernicious effects of corruption can be significantly reduced. In this
case, the bribe charged by an official is similar to a fee that is competitively determined (e.g.,
through Bertrand competition) and substitutes for taxes. As a result, the level of services and goods
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provision can approach the first best (socially optimal) level. On the other hand, when a
government official is the monopolist in the provision of public goods or services, a much higher
user fee will be charged, leading to a lower level of provision of the goods or services and slower
economic growth.
To ensure that there is competition among officials, economic agents demanding the good or
services must be able to move from one provider to another (or credibly signal that they can do so)
and have the information regarding the user fees in other regions to exploit the differences in user
fees. In a more general and realistic setting with transaction costs (for switching), we show that an
imperfect Bertrand competition yields an output level that is below the first best level (with perfect
competition) but higher than that of monopoly, and that the cost of implementing the optimal salary
scheme is lower. Thus, the central government is less likely to be constrained by insufficient tax
revenues. An implication of this result is that economic agents can alleviate the damaging effects of
corruption through reducing their own transaction costs. For example, small firms are easier to
relocate than large firms; firms operate in industries that require small scales of investment in fixed
assets can also relocate at low costs. Therefore, the size and choice of assets makes it more difficult
for corrupt officials in any region to extract rents from firms.
The main policy implication from our analysis is that setting up the provision of government
services and goods in a competitive environment reduces the damaging effects of corruption and
promotes growth. In practice, anti-corruption legislations and strong punishment on corruption
have been proved to be inefficient in combating corruption in some countries/organizations (e.g.,
Olken and Pande 2012, Ogus 2004). One of the reasons is that corruption also occurs in law
enforcement and monitoring system, and corrupt officials can get away with it by bribing the
inspectors (e.g., Damania 2004). What we are proposing, introducing competition in the
organizational structure, is more effective in controlling corruption in the sense that it is incentive
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compatible and therefore is immune from corruption in the enforcement system. One way to
implement this would be to decentralize the provision of services and goods to local government
officials or agencies. A potential problem with the delegation of the provision to local officials or
agencies is quality control (e.g., banking licenses to incompetent firms), and thus monitoring may
be necessary to ensure that quality is not compromised under decentralization. In large and
diversified countries, a competitive environment can also be created by encouraging inter-regional
economic activities and lowering the costs (and bureaucracy) of relocation across regions, while in
small and homogeneous countries this can be done by encouraging international trade and lowering
the costs of relocation across countries. Another policy implication to introduce competition and
reduce friction is through facilitating information revelation, specifically the fee charged by other
officials. For example, the central government can reward officials whose regions have shown the
fastest economic growth and attracted the largest amount of economic activities (and investment)
from non-local sources as in China. These policies encourage inter-regional competition among
officials and induce more government services and goods to be supplied. It may in circumstances
be better not to heavily penalize corruption to facilitate the provision of price information.
Our results are broadly consistent with evidence on corruption and growth and provide new
predictions. First, corruption is more likely to occur in countries whose governments have low
taxing ability and tax income – most of these countries are poor and developing countries. Second,
in large and regionally diverse countries such as China and India, there is a limited amount of bribes
officials can extort because of regional competition (e.g., Burgess et al 2012). In some African and
South American countries with homogeneity across regions (in part due to historical reasons from
colonial eras), corrupt officials effectively have monopoly power and this allows them to extract
much larger amounts of rents, which in turn significantly reduces the level of economic activities.
Third, consistent with the implications of our model, there is cross-country evidence on the negative
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relation between “openness” of an economy (e.g., exports/GDP) and corruption, and a positive
relation between corruption and excessive regulation of entry of new firms (e.g., Djankov et al.
2002; Svensson 2005).
Fourth, our model shows that corruption has less damaging effects on industries and firms
that can be easily relocated. Consistent with this prediction, in both China and India, the sectors
that have witnessed the fastest growth are small- and medium-sized firms from services and labor-
and technology-intensive industries (e.g., Allen et al. 2005, 2012), while in Russia, an economy
dominated by large corporations in heavy manufacturing industries, firm-growth in a large number
of industries has lagged behind other countries. Further empirical studies can systematically
examine the impact of corruption on different industries across countries or different regions within
the same country.2 Finally, in China, one of the key yardsticks in measuring the performance of
local officials is economic growth and the amount of investment from non-local sources (e.g., Li
1998; Li and Zhou 2005); in other countries the most corrupt government officials hold the highest
positions in the government, making it impossible to implement incentive-aligning policies for
lower level officials.
Our paper contributes to the related strands of literature on political economy, institutions
and economic growth. Proponents of institutional development argue that a country’s institutions
restraining the government and powerful elites, determine the country’s long-run economic growth
(e.g., Rajan and Zingales 2003a, b; Acemoglu and Johnson 2005). Unlike this line of research and
most of the literature on corruption that focuses on its negative impact on growth, we show that,
because of competition among officials, lack of corruption is not a necessary condition for
economic growth. We also propose different degrees of competition (among officials) as the new
rationale to explain cross-country (and regional) differences of corruption and growth. In addition,
2 With survey data on firms from Uganda, Svensson (2003) finds that firms with less sunk costs (of capital stock) pay
smaller amount of bribes, consistent with our model prediction.
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our model shows reducing corruption can be expensive and therefore depends on the budget of the
central government. As a result, during early phrases of economic development, policies aiming at
eliminating corruption by raising salaries of officials are not likely to succeed, while policies to
increase the degree of competition among officials in providing the same services and goods can be
much more effective in reducing the damaging effects of corruption.
The rest of the paper is organized as follows. In Section II, we review related work and
present empirical evidence on corruption, governments’ taxing ability and economic growth.
Section III presents a model of corruption based on standard models of industrial organization and
market power. Section IV discusses model implications and limitations, and Section V concludes.
II. Related Work and Facts about Corruption
The ideas that corruption does not necessarily slow down economic growth, and conceivably
certain forms of “efficient corruption” can actually promote growth, can be traced back to at least
Leff (1964) and Huntington (1968). These authors argue that corruption is more likely to occur
during periods of rapid economic and social development and modernization. They also argue that
through bribing corrupt officials economic agents can bypass bureaucracy and bad, rigid laws and
regulations and expedite activities that lead to faster economic growth. Subsequently, researchers
formalized these ideas by modeling competition among economic agents (e.g., banks applying for
licenses) in submitting bribes to officials (e.g., Lui 1985; Bliss and Di Tella 1997; Ades and Di
Tella 1999). However, this type of competition may not be enough to reduce the damaging effects
of corruption, because corrupt officials may favor more distortions and secrecy than granting the
license to the most efficient agent as argued by Shleifer and Vishny (1993).3 In our model, we take
the competition among agents as given and focus on competition among officials in providing the
3 Most of the literature focuses on the negative impact of corruption on economic development. See, for example,
Svensson (2005) for a review of the literature.
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same service or good, and show that this latter form of competition is more important in terms of
reducing the damaging effects of corruption.
While Shleifer and Vishny (1993) focus on reasons why corruption can have a significantly
negative impact on economic development, we focus on how competition among officials can
minimize these damaging effects. Like their paper, we show that the ‘industrial organization’ of the
provision of government goods and services is an important determinant of the effects of corruption.
Unlike their paper, we argue that the fundamental reason for the occurrence of corruption is an
agency problem, while the government’s inability to collect sufficient taxes to compensate the
officials adequately leads to the prevalence of corruption. Competition among officials can yield the
same outcome as the first best situation when the government has sufficient tax income. We also
argue that competition among officials is a robust mechanism in dealing with corruption, even if the
central government cannot monitor the process through which the services or goods are provided by
local officials (e.g., officials can lie about the quantity of services sold or the amount of money they
have collected).
There is a strand of literature examining how the central government can control corrupt
officials at local levels providing goods and services. Following Becker and Stigler (1974), most of
the literature regards the relation between central and local government officials in the framework
of a principal-agent relationship, and study ways to motivate the ‘agent’ (local officials) to carry out
their tasks congruent with the goals of the ‘principal’ (central government) that is to promote
economic growth. We also have the principal-agent problem in our model. In addition, we focus on
what policies and performance evaluation measures the central government can come up with to
motivate competition among officials. We argue that these policies and salary contract paid by
central government to local officials are both of first order importance, and they substitute each
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other in the sense that when competition among officials is high the optimal payment made by the
central government is low.
Our work is also closely related to the literature on the structure of the bureaucracy. Tiebout
(1961) argues that decentralization enhances efficiency because of the informational advantage and
tailored regulation by local officials. Albornoz and Cabrales (2013) argued and provided empirical
evidence that decentralization reduces (aggravates) corruption for sufficiently high (low) levels of
political competition. Our model predicts that increasing competition at the same level always
reduce corruption. Djankov et al (2010) and Banerjee et al (2011) showed that transparency helps
curtail corruptions by allowing the public to monitor government officials. Our model also features
the positive effect of transparency in controlling corruption, however through facilitating the
comparison of user fees and thus mobility across regions.
Finally, there is also a literature on institutions and long-run economic growth. For example,
Rajan and Zingales (2003a, b) and Acemoglu and Johnson (2005) argue that institutions restraining
the government and the powerful elites promote economic growth. In this regard, the evidence in
China and India provides important counterexamples to this literature, in that despite powerful elites
and corruption these countries have achieved impressive growth records. In this regard, our model
provides a new rationale on why lack of corruption is not a necessary condition for economic
growth among emerging economies.
Insert Tables 1 and 2 here.
Table 1 lists the largest twenty economies in the world as of 2014 using both (unadjusted)
simple exchange rates and those that are based on purchasing power parity (PPP); the table also lists
the top twenty economies that have the highest growth rates (GDP and per capita GDP) during the
period 1990-2014. As shown in Table 3-B, some of the most corrupt countries (measured by the
CPI and highlighted in bold) are also among the largest and fast growing economies, led by China
10
and India. These facts reinforce our research goal that understanding how corruption affects
economic growth differently across countries is an important question for the world economy and
development. Table 2 presents the results of Bribe Payers’ Index (BPI) in 2011 and 2008,
published by the Transparency International. The BPI is based on the responses of 3,016 in 2011
(2,742 in 2008) business executives worldwide to questions about the propensity of foreign firms
that do the most business in their country to pay bribes or to make undocumented extra payments.
The answers are converted to a score between 0 (bribes most frequent) to 10 (bribes never occur),
and the ranking of 28 in 2011 (22 in 2008) of the leading countries, including all G20 countries,
listed shows the average score of a country. Consistent with the rankings of CPI, firms from the
three largest emerging countries (using PPP), China, India, and Russia, have the lowest BPI
rankings or the highest propensity of paying bribes.
Tables 3-A and 3-B compare government’s taxing ability, measured by total taxes collected
over GDP, economic growth and income level, measured by both GDP growth and per capita GDP,
across three subgroups of countries ranked by corruption. As mentioned above, the corruption
measure we adopted is the CPIs of Transparency International, which provides the most
comprehensive (both in terms of number of countries covered and time horizon; using other
corruption measures produced very similar results; see, e.g., Svensson 2005). We divided all
countries into two groups according to their average CPIs from 1995 to 2014. The more (less)
corrupt countries have CPIs above (below) the sample median. Consistent with prior research,4
countries in the more (less) corrupt group are on average poor (rich) and have low (high) taxing
abilities proxied by a smaller (larger) fraction of total taxes collected by the government of GDP.
These results motivate our model assumptions that the reason corruption alleviates is because the
4 There is a strand of literature documenting the scale of shadow economies around the world (e.g., Friedman et al. 2000;
Schneider and Enste 2000, 2002). Researchers find that the size of the shadow economy is larger (relative to GDP) in
poor countries, especially where the tax rates are high, and that there is a positive correlation between size of shadow
economy and corruption.
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government can raise enough tax revenues to pay the government officials for providing goods and
services at socially desirable levels.
Tables 3-A and 3-B also show that while the average GDP growth rate (during the 1981-
2014 period) for the more corrupt group is higher than that of the less corrupt group, this difference
is small; perhaps not surprisingly, the standard deviation of growth rates is also higher in the most
corrupt group than for the least corrupt group. In most of the regression analysis (e.g., Mauro 1995;
Svensson 2005), researchers generally do not find a statistically significant relation between
corruption and GDP growth after controlling for other standard growth factors (such as human
capital, initial growth conditions, etc). While this puzzling fact may be explained by measurement
errors of corruption, we interpret it as evidence showing that the forms and damaging effects of
corruption vary significantly across countries. The main purpose of our model is to provide a
rationale for this interpretation and draw policy implications.
Table 3-B furthers our interpretation of the lack of significant relation between corruption
and growth. Panel A compares government’s taxing ability and economic growth (measured by
both GDP growth and per capita GDP) across the largest more corrupt countries in the world, while
Panel B lists the largest less corrupt countries in the world. There are significant variations in terms
of economic growth among the countries with lowest scores on corruption in Panel A. China
appears to be the most significant ‘outlier’ in the group: While its corruption index/score (based on
Transparency International’s CPI index, ranges from 1 to 10 with 1 being the most corrupt) had
improved from 2.2 in 1995 to 3.6 in 2014, its annual GDP growth rates (using PPP measures) of
almost 13% during the period 1981-2014 is the highest in the world; in PPP terms it currently has
the largest economy in the world; and per capita GDP increased from US$343 in 1981 by 37 fold to
almost $12,880 in 2014. Similar (but less spectacular) cases are other large and regionally
diversified countries such as India and Indonesia, in that despite rampant corruption, these countries
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have done quite well in terms of economic growth. At the other extreme, many countries in Africa
and South America with similar scores on corruption have basically stagnated and there is nearly no
growth in sight. Finally, a large and regionally diversified country with rampant government
corruption, Russia, has done poorly in terms of economic growth during the same time period. Our
model is consistent with these facts about corruption and economic growth across countries.
III. A Simple Model of Government Goods and Services Provision and Corruption
We develop the simplest possible model for conveying our main message that competition
among officials reduces the damaging effects of corruption. We consider a central government’s
problem of providing a service (or good) to the public when there is an agency problem. We
analyze how this can be done with different structures of supplying the good and the efficiency of
different structures. We first examine the first best case without an agency problem. Next, we
analyze different cases where the government uses tax revenue as a resource of payment to local
official(s) to motivate the provision of the government service.
III.1 Elements of the Model and First Best Solution
We assume that the government service is homogeneous, in that there is no difference in
quality provided by different officials in different regions (of the same country or different
countries). We also assume that the demand for this good among economic agents from different
regions can be characterized by a downward sloping demand function. For simplicity, we assume
this function to be linear, and takes the form
P(Q) = W – aQ,
where Q is the equilibrium level of the good supplied in the economy, W indicates highest possible
consumer surplus (agent obtaining the good with price 0), and the parameter a ( > 0 ), indicates the
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sensitivity of quantity demanded when price changes.5 We further assume that the provision of the
government service is costly, and the cost is linear in the quantity supplied, i.e.
cQQC ,
where the constant c is the marginal cost for producing and supplying each additional unit. Local
government officials can charge fees to cover the cost of provision. The First Best case is achieved
when the fees charged by local government officials are observable.
With our model setup, it is straightforward to derive the First Best level of this government
service, Q*. This is achieved by increasing the supply of the service until the marginal cost of
supplying the last unit equals the marginal benefit of the buyer of the final unit, or
MC(Q)= c = P(Q). (1)
Solving for Q in (1) above gives
a
cWQ FB
,
and the associated user fee charged is
cPFB .
From standard demand theory we know that at this output level there is no deadweight loss and
social welfare is maximized. The First Best case is summarized in the following result.
Proposition 1 Without an agency problem, the government official(s) will charge PFB to supply QFB
units of the service in the economy.
5 Our assumptions on the demand function for the government service can be restrictive for two reasons. First, the
consumption or use of some services by one agent can have a positive (or negative) externality on other agents. This is
not captured by the above demand function. Second, one agent may need to purchase multiple government services and
goods in order to undertake her own activity, in which case the joint determination of the provision of all the services
and goods becomes important.
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III.2 Agency Problem: Monopoly vs. Perfect Bertrand Competition
Now suppose that there is an agency problem, and the local officials can potentially charge
higher than socially optimal fees to maximize their own payoffs. We assume that the monitoring of
officials’ fundraising and the provision of the good is imprecise, so that the supervisor of the
officials providing the service cannot differentiate the reasons why the total quantity supplied in the
economy is below QFB: This can be induced by officials charging excessive fees and thus reducing
demand, or because the officials lie about the amount that can be raised in the economy to cover the
production/supply costs (this can be due to the fact that there is some uncertainly in the economy
about how much funds can be raised for different purposes). In other words, the central government
cannot observe or derive the fee charged from the demand function. The lack of effective
monitoring implies the officials providing the service have the discretion to restrict the quantity that
is supplied so as to maximize their own benefits. This is our definition of corruption, with the user
fees charged in excess of PFB by officials corresponding to bribes. Although the central government
cannot monitor the local official(s), it may be able to mitigate the problem through a salary contract
as a function of the quantity of government good (or service) provided. For simplicity, we restrict
attention to the linear contract6
T(Q)=tQ+s.
We believe this linear payment contract captures the basic idea of pay for performance with the
simplest form. In practice, government officials may not directly receive pecuniary rewards for
good performance; however, performance is usually rewarded indirectly via promotion. For
example, in China the likelihood of promotion of local officials increases in their performance
including local economic growth and the amount of investment from non-local sources (e.g., Li
6 Holmstrom and Milgrom (1987) showed that linear contracts are more robust to agent manipulation.
15
1998; Li and Zhou 2005). As long as the reward scheme increases in performance, the general result
that the central government can mitigate corruption by adopting such a reward scheme goes through.
Next, we examine different structures of the government services market, focusing on the
supply side while taking as given the demand for the service. We first examine the case where the
provision of the service is carried out by one official so that he has monopoly power. This case can
be associated with the scenario that in one region there is only one government branch/office that
the service can be obtained. In countries with multiple regions where the same service is supplied,
this case corresponds to the situation in which it is impossible for agents from one region to move to
another, so that the official in each region is a monopolist in providing the service.
If the central government is budget constrained and cannot allocate any resource to pay the
local officials, given the monopoly and assuming that the demand function is relatively inelastic
(a >> 0), the official has an incentive to cut back the quantity supplied, raise the fee (assuming he
cannot price discriminate between buyers of the service so he can only set one fee for all units) and
maximize his total fees from providing the good. To do this, the monopolist official supplies the
government service until the marginal cost of supplying the last unit equates that of his marginal
revenue of selling the unit, which is below marginal benefit of the buyer of the final unit:
aQW
dQQQdP
QMRcQMC 2
. (2)
Solving for Q in (2) yields
a
cWQM
2
,
and the corresponding excess user fee for each unit of the government good charged by the
monopolist official is given by:
2
cWPQPf FBMM
. (3)
16
Again, from standard industrial organization and market structure models, we know that the output
level under monopoly, QM, is strictly below the First Best level, QFB, derived in (1). The
comparison of output levels under different structures are illustrated in Figure 1, which also depicts
the profits earned by the monopolist official as well as the deadweight loss generated by the less-
than-optimal level of provision of the government good.
Insert Figure 1 here.
The profits earned by the official, net of the costs of supplying QM to the agents in the
economy, is indicated by the shaded area in Figure 1, while the deadweight loss is indicated by the
dark triangle. The size of the loss, indicated by the shaded area of the triangle, is proportional to the
product of the differences in output levels (QFB – QM) and the profit margin (P(QM) –c)):
a
cWcQPQQDWLoss MMFBM
8
)(
2
1 2 , (4)
where the last equality is derived by plugging in the expressions for Q* and QM.
If the central government has enough tax revenues to pay the local official to increase the
provision of government good, and the payment contract {t, s} is
0
)(stQ
QTif
ifM
M
The objective of the local official now is to maximize the profit from fees plus compensation:
)()(max QTcQQQPQ
, (5)
Solving for Q in (5) yields
MQa
tcWtsQ ,
2max),( . As long as t>0, the monopolistic official
is willing to increase the quantity of the service supplied, and therefore the government can
successfully mitigate the agency problem by offering payment with high sensitivity to quantity.
However, it is also costly for the central government to adopt such a payment scheme. To model the
17
cost, we assume that the total social welfare created consists two parts: that from supplying the
specific government good (service) and that from other government activities. A central government
can make use of its tax revenues of amount g to create social welfare v(g) through other government
activities, where 0)( gv and 0)( gv for all 0g . The cost of payment scheme can be
interpreted as the opportunity cost of reducing welfare through other government activities. And a
negative second order derivative of v(g) indicates that the marginal cost of implementing the
payment scheme is lower for “wealthier” central government. The average welfare created per unit
of the government good (service) is ))((2
1cQPcW , thus the total welfare created from
supplying the government good (service) is QcQPcW ))((2
1 . If the central government
allocates T(Q) for the payment scheme, the welfare created from other activities is then v(g-T(Q)).
Therefore the optimal contract to offer for a government with total budget g can be calculated as
follow,
)())((2
1max
,QTgvQcQPcW
st (6)
subject to
MQa
tcWQ ,
2max (7)
0)( MQT (8)
The solution (see proof in appendix A.1) to the central government’s problem {tM, sM} is such that
4
1
42
2
M
M
t
cW
a
tgv (9)
MM ta
cWs
2
. (10)
The corresponding quantity supplied and excess user fee charged are
18
),(2
ˆ FBMM
M QQa
tcWQ
(11)
),0(2
ˆ MM
M ftcW
f
. (12)
respectively. The central government needs to allocate
a
tQT
MMM
2)ˆ(
2
(13)
to pay the monopolistic local official, and the total social welfare loss compared to the first best
case is
),0()2
()(8
)(22
MMM
M
T DWLossa
tgvgv
a
tcWDWLoss
. (14)
Note that even if the government has enough resources, the quantity supplied under the payment
scheme is strictly less than the first-best level. In other words, even if it is able to eliminate
corruption completely the central government chooses not to. This is because the marginal cost of
inducing the official to increase the supply of government good increases. It is simply too costly to
eradicate corruption, and the central government is better off to live with moderate corruption and
save the tax revenue for other purposes. This result may be qualitatively sensitive to the structure of
payment scheme, but the general intuition of increasing marginal cost of combating corruption
should hold as long as the limited liability constraint (8) is imposed. Proposition 2 (see proof in
appendix A.2) below summarizes the results for the monopolist case.
Proposition 2 With a monopolist official providing the government good, the central government
optimally offers payment contract },{ MM st as in equation (9) and (10), and the excess user fee
charged for each unit is set at ),0(ˆ MM ff as in equation (12), resulting in a total of
),(ˆ FBMM QQQ units supplied in the economy as in equation (11). The total payment to the
19
monopolistic official )ˆ( MM QT as in equation (13) increases when: i) W increases; ii) c decreases;
iii) a decreases and iv) g increases. The deadweight loss of the monopolist
supplier ),0( MM
T DWLossDWLoss as in equation (14) increases when: i) W increases; ii) c
decreases; iii) a decreases; and iv) g decreases.
The comparative statics on the total payment of the incentive scheme )ˆ( MM QT are intuitive.
A higher W and (or) a lower c indicates higher consumer surplus from consuming the government
good, and hence more incentive for the central government to reduce corruption and increase the
quantity supplied. Therefore, the central government would allocate more resource to the incentive
scheme to control corruption when W increases and (or) c decreases. A lower a, the slope of the
demand curve implies that consumers are more reactive to price changes. If the corrupt government
official reduces the bribe it charges, the quantity demanded would increase a lot, and the social
welfare would be restored a lot. In other words, the incentive scheme is more valuable and the
central government is willing to allocate more resources to implement it. Lastly, for a government
with more tax revenues, the same incentive scheme is relatively cheaper due to the concavity of v(g),
and therefore the government can afford to pay for a larger incentive scheme.
The comparative statics on the size of the deadweight loss M
TDWLoss are generally the same
with those on the total payment )ˆ( MM QT with the exception of tax revenues g. The general
intuition is that when it is more efficient to implement the incentive scheme which leads to higher
)ˆ( MM QT , there is also more room for profits for the corrupt official and hence larger M
TDWLoss .
Specifically, a higher W and (or) a lower c indicates higher consumer surplus and therefore more
profits for the corrupt official leading to a larger deadweight loss. A lower a implying higher
elasticity of demand to price, which gives the corrupt official more bargaining power in abusing its
20
monopoly power and turn it into profits. Thus, M
TDWLoss decreases in a. Finally, although a
“wealthier” government spend more tax revenue on the incentive scheme, the benefit of reducing
corruption overweighs the cost. To see why this is the case, consider two governments with
different budgets. Suppose the deadweight loss generated under optimal incentive scheme for the
resource-constrained government is D1. If the resourceful government were to implement the same
incentive scheme, the resulting deadweight loss D2 must be smaller. Yet the resourceful government
would optimally choose a larger incentive scheme leading to deadweight loss D3. Since D3 is
generated under optimal choice, it must be smaller than D2, therefore smaller than D1.
Next suppose that the government sets up two suppliers for provision of the service (results
would be very similar if there are more than two suppliers), and all consumers are perfectly
informed of the fees charged by both suppliers. This can occur if in any region, where the good is
provided, there are two government branches/offices from which agents can purchase the service.
This can also occur if agents can move from one region to another (to exploit differences in fees)
without any costs. In either case there is competition among officials. Since in most cases the
officials set and announce the user fees to all potential buyers, we assume that there is Bertrand
competition for the same service.7
Given that there are no costs in resetting prices and that the pricing information becomes
immediately known to all agents in the economy, similar to standard one-period Bertrand
competition models, there is a unique Nash equilibrium in this case, where each supplier will set the
user fee to be the marginal cost of supplying the last unit. But this is exactly the same condition in
the First Best, indicated in (1). Hence the total units supplied in the economy is the First Best level,
Q* again. Since each official is earning zero profits under Bertrand competition, it does not matter
7 Alternatively, government officials may choose the quantity to sell and the same (per unit) fee for the service is
determined in the market place. In this case we have Cournot competition and the output level is higher than the
monopoly case but lower than the Bertrand competition case.
21
how they split the total supply between them; without loss of generality we assume each official
provides exactly half of Q*. Hence Bertrand competition generates outcomes that are identical to
the First Best solution in Figure 1, and the equilibrium fee can be found by equating the marginal
cost function to the demand curve. The key for the above results is that, if the fee set by one of the
officials is higher than marginal cost of producing the last unit, by undercutting the fee by the
other official can capture the entire market (recall that all agents can move to another region without
costs) and maximize profits, in the process of doing so also driving the demand for the official with
the higher user fee to 0. In this case, competition also completely eliminates the agency problem,
therefore the central government doesn’t need to pay the local officials to align their incentives with
the social optimum.
Proposition 3 With two or more officials providing the same government service, the First Best is
restored, and the unique equilibrium excess user fee for each unit is set at 0Bf , resulting in a
total of QB =QFB units supplied.
Bertrand competition not only yields the First Best output level for the provision of the government
good, it also requires almost no monitoring of the officials. This is because the market mechanism
of competition is self-enforcing due to each official’s incentive to undercut the user fee set by other
officials and capture the entire market demand for the same good. However, all the analyses in this
paper rely on the assumption that the officials cannot collude on reducing supplies to achieve higher
profits.
III.3 Agency Problem: Imperfect Bertrand Competition with Transaction Costs
22
In the previous subsection we considered two extreme cases of how the government good is
provided. More generally, the industrial organization structure in the provision of the service will
often lie between monopoly and perfect Bertrand competition. In this subsection, we consider
imperfect Bertrand competition, in that the agents from each region can move to another region at a
constant cost K (we assume that 2
cWK
)8. The cost K can also be interpreted as the cost of
acquiring information about the fee charged by the non-local government official. Since now agents
cannot move from region to region to explore differences in user fees for free, each of the two
officials has some monopoly power in setting the user fee. In particular, each official knows that, in
order to capture the entire market of demand for the same government good, he must undercut the
other’s user fee by at least K, as any smaller cut would not attract any agents to move from the high-
fee region to his region. On the other hand, if there is room to cut the user fee by K and still have a
positive profit margin, then an official will indeed cut the fee by K.
Given the above intuition, it is then straightforward to show that without the compensation
scheme offered by the central government, the equilibrium pricing strategy for each local official is
to set the fee K above the marginal cost of providing the last unit:
MC(Q) + K = P(Q), (15)
which yields a lower total quantity supplied (with each of the two officials supplying half of the
total),
a
KcWQB
K
,
than that under perfect Bertrand competition (QB), and a higher excess user fee
Kf B
K ,
8 If 2
cWK
, it is too costly for an agent to move to another region, and we get back to the monopoly case.
23
than that under perfect Bertrand competition (fB). Note that it is implicitly assumed that each local
official can charge different user fees for local and nonlocal agents. Specifically, the excess fee
charged for nonlocal (local) agents is 0 ( Kf B
K ), so that all agents, local or nonlocal, are all
indifferent between going to any of the two officials for the public good. If we assume the cost of
moving to another region K is a deadweight loss, then all agents going to the local official is
socially optimal. The equilibrium fee and quantity (relative to the perfect Bertrand competition) are
illustrated in Figure 2. The current structure of government good provision will also result in a
deadweight loss (shaded area), however smaller than the monopoly case:
a
KKQQDWLoss B
K
FBB
K22
1 2
. (16)
Insert Figure 2 here.
Now we explore the central government’s optimal payment scheme under imperfect
Bertrand competition. Since the severity of the agency problem lies in between the monopoly and
the perfect competition, intuitively, the payment contract should also lie in between the two cases.
Below is the formal characterization of the central government’s problem:
))(())((2
1max
,QTgvcQPcWQ
st (17)
subject to
B
KQa
tcWQ ,
2max (18)
0)( B
KQT (19)
When KK , the imperfect Bertrand competition outcomes are already close to the First Best case.
The bonus required to incentivize the local government officials to cut their profit from corruption
further is so costly that the central government would rather leave the moderate level of corruption
as it is. To see it clearly, the quantity supplied with the incentive scheme is
24
a
KcW
a
tcWQB
K ,2
maxˆ . Hence a effective payment scheme needs to have pay-for-
performance a
KcWt
2
2 which decreases in K . When the friction is relatively small, t needs to
be high to induce the corrupt officials to reduce their bribe charges further and therefore the total
payment of the incentive scheme would be large. Therefore, the equilibrium excess fee charged
B
K
B
K ff ˆ , the quantity supplied B
K
B
K QQ ˆ , the total payment to local officials 0)ˆ( B
K
B
K QT and the
deadweight loss B
K
B
TK DWLossDWLoss , . Proposition 4 (see proof in Appendix A.3) below
summarizes the results for the imperfect Bertrand competition case with low transaction cost.
Proposition 4 With imperfect Bertrand competition and transaction cost ],0( KK , the central
government optimally choose to offer zero payment contract.
When )(21
)()(
gv
gvcWKK
, the optimal salary contract is B
K
B
K st , is such that
)22(22
2
cWKt
tcW
a
cWKttgv
B
K
B
K
B
K
B
K
(20)
B
K
B
K
B
K Qts . (21)
The equilibrium excess user fee charged is
)ˆ,0(2
ˆ MB
KB
K ftcW
f
, (22)
resulting in the quantity of public good supplied
),ˆ(2
ˆ FBMB
KB
K QQa
tcWQ
. (23)
The central government needs to allocate
25
)ˆ(,02
2)ˆ( M
B
K
B
KB
K QTa
cWKttQT
(24)
in total to pay the local officials, and the total social welfare loss compared to the first best case is
M
T
B
K
B
K
B
KB
TK DWLossa
cWKttgvgv
a
tcWDWLoss ,0
2
2)(
8
)( 2
,
. (25)
Note that under the optimal incentive scheme, the imperfect Bertrand competition case is always
closer to the first best than the monopoly case, i.e. MB
K ff ˆˆ , MB
K QQ ˆˆ and
M
T
B
TK DWLossDWLoss , . Proposition 5 (see proof in Appendix A.3 and A.4) below summarizes the
results for the imperfect Bertrand competition case with high transaction cost.
Proposition 5 With imperfect Bertrand competition and transaction cost )2
,(cW
KK
, the
central government optimally offers payment contract },{ B
K
B
K st as in equation (20) and (21), and the
excess user fee charged for each unit is set at )ˆ,0(ˆ MB
K ff as in equation (22), resulting in a total
of ),ˆ(ˆ FBMB
K QQQ units supplied in the economy as in equation (23). The total payment to the
monopolistic official )ˆ( B
K
B
K QT as in equation (24) increases when: i) a decreases; ii) g increases;
and iii) K increases. The deadweight loss of the monopolist supplier ),0(,
M
T
B
TK DWLossDWLoss as
in equation (25) increases when: i) a decreases; ii) g decreases; and iii) K increases.
The comparative statics on the total payment of the incentive scheme )ˆ( MM QT are intuitive.
Similar to the monopoly case, a lower a implies a more elastic demand and also a more valuable
incentive scheme (a small reduction in bribe induces a large increase in demand), therefore the
central government is willing to allocate more resources to implement it. For a government with
26
more tax revenues, the same incentive scheme is relatively cheaper due to the concavity of v(g), and
therefore the government can afford to pay for a larger incentive scheme. Lastly, the total payment
decreases in friction K. The intuition is that when the friction is relatively small, it is very costly to
induce the corrupt officials to reduce their bribe charges further and therefore the government
would not spend much on the incentive scheme. Since the objective welfare function and the
constraints are all continuous in K, this intuition also explains that when KK , the optimal
incentive scheme payment reduces to zero.
The comparative statics on the size of the deadweight loss M
TDWLoss are also intuitive. A
lower a implying higher elasticity of demand to price, which gives the corrupt official more
monopolistic profits. Thus, M
TDWLoss decreases in a. A government with sufficient tax revenues
(high g), has more power and flexibility in controlling corruption, and therefore the resulting
deadweight loss is small. Finally, the deadweight loss increases in the transaction cost K, because
the corrupt officials have more monopoly power if the friction K increases. In addition, as K
increases, the imperfect Bertrand competition case approaches the monopoly case explained in
Proposition 2 (and if 2
cWK
these two cases are identical).
Note that competition helps alleviate the agency problem in two ways. First, as the friction
in competition K decreases, the power that the officials have in extracting surplus from the agents
decreases directly, as evidenced by a
KcWQB
K
decreasing in K. Secondly, as the friction in
competition K diminishes, the payment that the central government makes decreases holding
everything else equal. From another perspective, the competitiveness in the supply side of the
service and the compensation contract can be thought of as substitutes in reducing corruption.
Lowering competition friction, on one hand, reduces corruption, while on the other hand, making
27
incentive scheme less effective and more costly to implement. In terms of policy implication, if a
central government has sufficient tax revenues, it has more tools and flexibility in controlling
corruption. However, if a central government has limited resources to allocate on salary payment,
the central government can instead work on reducing the frictions in competition among local
officials.
III.4 Multiple Government Goods
In this section, we compare different forms of government organizations when there are
multiple government goods supplied. In particular, if the government goods (service) supplied are
substitutes or complements, corruption on one of the goods might have externalities on the others.
Therefore, corrupt officials might have the incentive to jointly make the decision on bribe charges
and split the profits. In this situation, ensuring coordination among various officials is perhaps as
important as creating a competitive environment to reduce user fees set by each official. We show
that such organized corruption generates higher profits for corrupt officials than the case where they
charge bribes independently. We also show that the central government can reduce welfare loss by
altering organizational structure with the interdependency of different government goods.
Specifically, the central government can effectively combat corruption by introducing competition
when the two goods are substitutes and introducing cooperation when the two goods are
complements. Nonetheless, the results that increasing regional competition and introducing
incentive scheme are effective in reducing corruption still hold.
For simplicity, we assume there are two symmetric government goods with demand function
2
1
2
1
P
P
Q
Q
ab
ba
W
W.
28
The elasticity of demand can be shown to be22 ba
a
dP
dQ
i
i
and
22 ba
b
dP
dQ
i
i
. We assume
that ba to ensure that the price change of one good has more effect on the demand of such good
than the price change of the other good. Since 22 ba
b
dP
dQ
i
i
, the two goods are complements if b
< 0; they are substitutes if b > 0; and they are independent if b = 0, in which case each good can be
analyzed separately as in the main body. The cost of supplying one unit of good 1 and the cost of
supplying one unit of good 2 are both Wc ,0 . First, we consider the case where two cooperative
corrupt officials set 1P and 2P to maximize their total profits. The maximization problem is as follow,
cbQaQWQcbQaQWQQQ
122211, 21
max .
The solution to the maximization problem, i.e. the quantity supplied under monopolistic organized
corruption, is )(2
21ba
cWQQQ CCC
. And the resulting bribes charged, i.e. the price paid in
excess of the cost of supplying one unit of government good, is 2
21
cWfff CCC
. While in
the first best case, 021 FBFBFB fff and ba
cWQQQ FBFBFB
21 . Since the total welfare
created in the first best case changes in b, to analyze the effect of b on welfare changes, we
introduce a new measure, the percentage deadweight lossFBWelfare
DWLossDWL % . Following similar
calculation as in equation 4, it can be shown that the deadweight loss as a percentage of the total
welfare
%25
)(2
1)(
2
12
1
2
1
%
21
222111
cWQcWQ
fQQfQQ
DWLFBFB
CCFBCCFB
C .
29
Note that although the absolute deadweight loss increases in the complementarity between two
goods, the percentage deadweight loss remains constant.
To demonstrate the externality of corruption on good to the other, we compare it to the case
where there are two non-cooperative corrupt officials each supplying one of the two goods. The
maximization problem of official i is then
cbQaQWQ iiQi
i-max .
The best response of one official to the other can be solved from the first order condition, and it can
be shown to bea
bQcWQQ i
i
BR
i2
)(
. By solving the fixed point in the best response mapping,
we get a unique equilibrium in which ba
cWQQQ NCNCNC
221 ,
ba
cWafff NCNCNC
2
)(21
and 2
2
)2(%
ba
aDWLNC
. Note that the percentage deadweight loss increases in the
complementarity between two goods. In addition, when the two goods are complements (b < 0),
CNC DWLDWL %% ; when the two goods are substitutes (b > 0), CNC DWLDWL %% ; when the
two goods are independent, CNC DWLDWL %% . The intuition is as follow. If the two goods are
complements, raising bribe charge on one good reduces the demand for the other good. In the
cooperative case, the corrupt officials endogenize this effect and therefore charges lower bribes than
in the non-cooperative case, where they don’t endogenize this effect. Similarly, if the two goods are
substitutes, raising bribe charge on one good increases the demand for the other good, and therefore
the cooperative officials charge higher bribes than non-cooperative officials. Although the social
welfare loss is affected by the interdependency of the two goods, the profit made by the two
officials in the cooperative case
)(22
2
ba
cWfQ CC
is always higher (strictly higher when 0b )
30
than that in the non-cooperative case
2
2
)2(
22
ba
cWafQ NCNC
, which implies that the corrupt
officials always have the incentive to engage in this type of organized corruption. Therefore, when
the two goods are complements, the central government can effectively reduce corruption by
encouraging cooperation between the two officials, which is also incentive compatible. While when
the two goods are substitutes, the central government would prefer local officials to make decisions
competitively. However, since the corrupt officials always have the incentive to engage in
cooperative corruption, the central government might need to introduce incentive scheme such as
relative performance to increase competition among local government officials.
Regardless, our results in the one good case that both competition and pay-for-performance
scheme are effective in combating corruption still hold in the multiple goods case. The
corresponding competition under the two goods context is that there exists at least two regions each
offering both goods, and consumers in the two regions can pay some transaction cost K to “buy” the
goods in non-local regions. Therefore, by nature the goods offered by different regions are
substitutes. As analyzed before, by introducing competition among different regions, the central
government can effectively reduce welfare loss.
IV. Discussion
The premise of our model is that the reason corruption occurs is an agency problem, and the
government can use a compensation contract to mitigate the problem and reduce corruption. Our
model implies that another and perhaps more effective method to reduce the pernicious effects of
corruption is setting up the provision of government services so that there is competition.
Corruption, in this case, is a legitimate way of collecting user fees to cover the cost of provision of
the service. In the ideal case of perfect Bertrand competition (without transaction costs), corrupt
31
officials (by charging a fee equal to the cost of provision) do not have any distortionary effects, and
the central government does not need to pay bonuses to the officials. In more general cases with
imperfect Bertrand competition while the outcome is not First Best, the competition among officials
still yields a better outcome than having a monopolist official providing the service, which is the
worst case.
An important reason for the damaging effects of corruption is the secrecy of corrupt
officials’ activities (including fees charged and bribes received), leading to distortions of incentives
and resource allocations as stressed by Shleifer and Vishny (1993). Having a competitive
environment for the provision of government goods and services lessens this problem, because each
official providing the services has the incentive to disclose his fee structure for granting the services
so as to attract more clients. In Asian countries such as China, there are usually publicly known
‘market’ prices for government services or goods, and with such transparency bribes can ‘grease the
wheels’ and improve the process of providing these services and goods.
The results of our model are broadly consistent with evidence on corruption and growth.
First, consistent with existing research, corruption is more likely to occur in countries whose
governments have low taxing ability and tax income, most of which are developing countries.
There is also evidence that corruption is more prevalent in developing countries or regions with
higher tax rates or higher federal transfers, all of which proxy for lower government taxable income,
while corruption is less prevalent where government activities are more decentralized (e.g., Fisman
and Gatti 2002a, b; Fisman and Wei 2004). Second, in large and regionally diverse countries such
as China, India and Indonesia, there is a limited amount of bribes officials can extort because of
regional competition. The bribes are fees in excess of the cost of provision and are very limited due
to competition, and incentives are efficient. In some African and South American countries with
homogeneity across regions (in part due to historical reasons from colonial eras), corrupt officials
32
effectively have monopoly power. As a result, we get the bad equilibrium with under supply of the
government service and overcharging by officials and extracting much larger amounts of rents,
which in turn significantly reduces the level of economic activities. In fact, consistent with the
implications of our model, there is cross-country evidence on the negative relation between
“openness” of an economy (e.g., exports/GDP) and corruption, and a positive relation between
corruption and excessive regulation of entry of new firms (e.g., Djankov et al. 2002; Svensson
2005). In addition, a recent empirical paper, Hanousek et al. (2015), presented evidence that greater
variance in perception of corruption is associated with more efficiency. The argument is that a high
variance indicates different local sub-environments, among which the competitive ones are
relatively efficient and improves the welfare of the whole environment.
The main policy implication from our analysis is that setting up the provision of government
goods and services in a competitive environment reduces the damaging effects of corruption and
promotes growth. A natural follow-up question would be how to introduce more competitiveness to
the government services market. In large and diversified countries, this can be achieved by
encouraging inter-regional economic activities and lowering the costs (and bureaucracy) of
relocation across regions and entry barriers for firms and agents. In small and homogeneous
countries this can be done by encouraging international trade and lowering the costs of relocation
across countries and entry barriers in different countries. These policies are more effective in
promoting economic growth in emerging countries than those intending to eliminate corruption,
because governments in emerging countries are more budget constrained and do not have the
resources to buy cleanness. This problem cannot be mitigated by the alternative of raising the
payments to officials until the country’s economic conditions have been significantly improved (in
the long run) and the government has the ability to raise sufficient tax revenues to cover the
payments to government officials. In Appendix B.1, we generalized our model to multiple
33
government goods case, and showed that the above policy implications are robust to this variation.
Moreover, the central government can combat corruption by encouraging competition for supplying
substitutes and encouraging cooperation for supplying complements.
Our model also implies that corrupt officials have an incentive to increase their monopoly
power, since the total amount of bribes received by a monopolist official is much higher than a
counterpart in a competitive environment. They can regain market power by, for example, blocking
information about similar goods and services provided in other regions/countries, or by increasing
the transaction costs for agents to relocate. Solving problems of this sort must involve the central
government. For example, the central government can reward officials whose regions have shown
the fastest economic growth and attracted the largest amount of economic activities (and investment)
from non-local sources. These policies encourage inter-regional competition among officials and
induce more government services and goods supplied and higher levels of growth. In China, one of
the key yardsticks in measuring the performance of local officials is economic growth and the
amount of investment from non-local sources (e.g., Li 1998; Li and Zhou 2005); in other countries
the most corrupt government officials hold the highest positions in the government, making it
infeasible to implement incentive-aligning policies for lower level officials.
The situation depicted in Proposition 4 with imperfect Bertrand competition is perhaps a
more general case. With transaction costs, each of the officials providing the services or goods
captures some rents by setting prices above marginal costs of supplying them by exactly the size of
the transaction costs (of agents). But the distortion is less than that of a monopolist official. An
implication of this result is that economic agents can alleviate the damaging effects of corruption
through reducing their own transaction costs. For example, small firms are easier to relocate than
large firms; firms operate in industries that require small scales of investment in fixed assets can
also relocate at low costs.
34
Consistent with this prediction, in both China and India, the sectors that have witnessed the
fastest growth are small- and medium-sized mobile firms from services and labor- and technology-
intensive industries (e.g., Allen et al. 2005, 2012). On the other hand, as Table 4 indicates, Russia’s
economy is dominated by large corporations in natural resources (“other” industry in the last
column) and heavy manufacturing industries. Firms in these industries face much higher relocation
costs and hence the damaging effects of corruption may be one of the reasons that economic
development in post-Soviet Union era (of Russia) has been lagging behind that of many smaller
former socialist countries in Eastern Europe. Further empirical studies can systematically examine
the impact of corruption on different industries across countries or different regions within the same
country.
We close this section by pointing out some limitations of our simple model. First, the
objective of the central government is not necessarily to maximize social welfare. The mapping of
our model to the reality depends on the benevolence of the central government. In the extreme case
that the central government is totally corrupt and aims to collect all bribe payments, introducing
competition only impedes the central government’s objective. Second, our static model doesn’t
allow collusion by competitive local officials. If we extend the model to infinite horizon repeated
game, a possible Nash Equilibrium is that the two local officials collude to charge a monopoly price.
However, in reality, there is often rotation of local officials after their tenures, hence the real
situation is closer to a finite repeated game or static game. As long as the game is finite, the unique
equilibrium is just the repetition of the static equilibrium as in our model. Third, our simple model
implies that the central government should decentralize and delegate the provision of goods and
services to local government officials. A potential problem with this delegation is quality control
(e.g., driving tests before issuing a driver’s license; see, e.g., Bertrand et al. (2006) for details). As
shown in the literature on franchising, designing uniform and enforceable contracts across the board
35
and monitoring the local officials effectively are necessary conditions to ensure that the quality of
the goods and services provided is not compromised under decentralization.
V. Summary and Concluding Remarks
This paper proposes an explanation for the puzzling fact that rampant government
corruption is not associated with slower economic growth at the country level. We focus on
corruption associated with the provision of government goods and services, including those to the
public such as driver’s license and those to firms such as a banking license for financial firms. We
first show that corruption occurs because of an agency problem, and the government cannot
effectively control corruption without sufficient revenues to pay the officials. The bribes received
by officials can be regarded as user fees in excess to the cost of provision of the service. We then
argue that the structure of the provision of government services and goods partially determines the
negative effects of corruption and the cost of curbing it: when multiple officials undertaking the
same project, the fee is determined competitively such that the pernicious effects of corruption are
minimized, and the payments to the officials are also minimized; when each official is a monopolist
in the provision of the services and goods and the damaging effects are much higher, as are the
payments to the officials.
The main policy implication from our analysis is that there are two substitute ways to
control corruption: setting up the provision of government services and goods in a competitive
environment and incentivizing officials with performance-sensitive payment contracts financed by
tax revenues. In large and diversified countries competition can be introduced by encouraging
inter-regional economic activities and lowering the entry barriers for firms and agents from different
regions. In small and homogeneous countries this can be done by encouraging international trade
and lowering the costs of relocation across countries. Economic agents can make the competition
36
mechanism more effective by reducing their own transaction costs when moving from region to
region. An implication for this result is that corruption has a smaller negative impact on small firms
and firms that have smaller amount of fixed assets. Finally, the central government can also control
corruption of this type by rewarding officials whose regions have shown the fastest economic
growth and attracted the largest amount of economic activities from local and non-local sources.
These policies encourage inter-regional competition among officials, and are more effective in
promoting growth than policies aiming at eliminating corruption considered in our paper in
emerging countries that do not have sufficient tax revenue for the appropriate compensation of local
officials.
37
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40
Appendix A Proofs
A.1 Central Government’s Maximization Problem: Monopoly
Denote the optimal contract as {tM, sM}, the induced quantity supplied as MQ̂ and the
induced excess user fee charged as FBMM QQPf )ˆ(ˆ .
First, assume tM>0, which implies that MM
M Qa
tcWQ
2ˆ . Note that the total social
welfare decreases in T(Q)=T(QM)+t(Q-QM), thus decreases in T(QM). Therefore, the limited
liability condition (equation 8) must bind, i.e. sM =tMQM. Plug in s=tQM and a
tcWQ
2
into the
expression for the total welfare. Denote the total welfare as L(t). The maximization problem can
then be simplified as follow,
a
tgv
a
t
a
cWt
a
cWtL
t 284
)(
8
)(3)(max
222
The first order derivative of the above simplified problem is
a
tgv
a
t
a
tcWtL
24)(
2
Note that 0)(4
1)0( cW
aL and 0
2
)()(
2
a
cWgv
a
cWcWL , which implies the
optimal ),0( cWt M and verifies the assumption made at the beginning of the proof. By
equating the first order derivative to zero, we can solve for the optimal sensitive to pay tM, which
solves 4
1
42
2
M
M
t
cW
a
tgv .
Since ),0( cWt M , the induced quantity supplied is ),(2
ˆ FBMM
M QQa
tcWQ
41
and ),0(2
ˆ MM
M ftcW
f
. The total payment made by the central government is
a
tQT
MM
2)ˆ(
2
. The welfare in the first best case is )(2
)( 2
gva
cWWelfare FB
, and the resulting
deadweight loss with the optimal incentive scheme is
02
)(8
)()(
22
a
tgvgv
a
tcWtLWelfareDWLoss
MMMFBM
T . Since tM>0, L(tM)>L(0)
and MFBMFBM
T DWLossLWelfaretLWelfareDWLoss )0()( .
A.2 Comparative Statics in Proposition 2
Given that the optimal sensitive to pay tM is such that 4
1
42
2
M
M
t
cW
a
tgv . By implicit
function theorem, 0
24)(
22
2
3
4
2
2
a
tgvatcWa
ta
tgv
tda
d
MM
MM
M . Similarly, it can be verified
that 0MtdW
d, 0Mt
dc
d and 0Mt
dg
d.
Given that the deadweight loss is )2
()(8
)(22
a
tgvgv
a
tcWDWLoss
MMM
T
. The
signs of the partial derivatives can be verified to be 0
M
TMDWLoss
t, 0
M
TDWLossa
,
0
M
TDWLossW
, 0
M
TDWLossc
and 0
M
TDWLossg
. Intuitively, since Mt minimizes
deadweight loss, the first order condition ensures that 0
M
TMDWLoss
t.
42
Given that a
tQT
MM
2)ˆ(
2
, it can be verified that 0)ˆ(
a
tQT
t
MM
M,
02
)ˆ(T2
2
a
tQ
a
MM and 0)ˆ(T)ˆ(T)ˆ(T
MMM Qg
Qc
QW
.
The total derivatives can then be calculated as follow,
M
T
MM
TM
M
T
M
T DWLossx
tdx
dDWLoss
tDWLoss
xDWLoss
dx
d
and
MM
M
MM tdx
dQT
tQT
xQT
dx
d)ˆ()ˆ()ˆ(
.
Plugging in the signs, it can be verified that 0W
M
TDWLossd
d, 0
cM
TDWLossd
d,
0M
TDWLossda
dand 0M
TDWLossdg
d. Similarly, it is straightforward to verify that
0)ˆ( MQTdW
d, 0)ˆ( MQTdc
d and 0)ˆ( MQT
dg
d. As for the sign of )ˆ( MQT
da
d, it takes a few lines
to calculate:
0
28)(2
)(
24)(
22
2)ˆ(
2
3
2
2
3
4
2
2
22
2
a
tgvatcWa
cWt
a
tgvatcWa
ta
tgv
a
t
a
tQT
da
d
MM
M
MM
MM
MMM
.
A.3 Central Government’s Maximization Problem: Imperfect Bertrand Competition
Denote the optimal contract as B
K
B
K st , , the induced quantity supplied as B
KQ̂ and the induced
excess user fee charged as FBB
K
B
K QQPf )ˆ(ˆ .
43
First, assume KcWt B
K 2 , which implies that B
K
B
KB
K Qa
tcWQ
2ˆ . Note that the
total social welfare decreases in )()()( B
K
B
K QQtQTQT , thus decreases in )( B
KQT . Therefore the
limited liability condition (equation 19) must bind, i.e. B
K
B
K
B
K Qts . Plug in B
KtQs and
a
tcWQ
2
into the expression for the total welfare. Denote the total welfare as H(t). The
maximization problem can then be simplified as follow,
a
cWKttgv
a
t
a
cWt
a
cWtH
t 2
2
84
)(
8
)(3)(max
22
The first order derivative of the above simplified problem is
a
cWKttgv
a
cWKt
a
tcWtH
2
2
2
22
4)(
The first part in the derivative is the marginal benefit, i.e. the marginal welfare restored by
increasing the sensitivity of pay for performance. And the second part in the derivative is the
marginal opportunity cost, i.e. the marginal burden on other government activities of increasing the
sensitivity of pay for performance. The optimal incentive scheme can be found by equating
marginal cost to marginal benefit, mathematically by equating the first order derivative to zero. The
optimal sensitive to pay B
Kt is such that
)22(22
2
cWKt
tcW
a
cWKttgv
B
K
B
K
B
K
B
K
.
The last step in solving for the optimal incentive scheme is to verify the assumption that
KcWt B
K 2 , which is equivalent to verifying 0)2( KcWH . Plug KcWt 2 into
the first order derivative:
)(21
)()(0
2
2
2)2(
gv
gvcWKKgv
a
KcW
a
KKcWH
.
44
If KK , the friction in the competition is so small that the equilibrium is close to the first best,
and t needs to be really high to induce further reduction in the bribes charged by corrupt officials.
To see it clearly, consider a K close to zero. In order to reduce corruption through incentive scheme,
the sensitivity of pay for performance t needs to be close to W-c. Since
0))(
(2
)(
a
KcWgv
a
KcWcWH ,
i.e. the marginal benefit goes to zero, yet the marginal cost is strictly positive. Therefore, it is not
cost-efficient to offer such huge incentive package, and the optimal incentive scheme to offer is any
KcWt 2 and B
KtQs , which is outcome-equivalent to offering no incentive scheme. Note
that since 2
cWK
, the parameter space such that an effective incentive scheme is offered, i.e.
)2
,(cW
KK
, is non-empty.
Recall that the optimal contract in the monopoly case satisfies4
1
42
2
M
M
t
cW
a
tgv .
Calculate the first derivative of the total welfare at tM:
a
cWKttgv
cWKt
a
tgvt
atH
MMM
MMM
2
2
22
1)(
2
Since 2
cWK
and 0Mt , it must be true that
0
2
2
2
2
a
cWKttgv
a
tgv
MMM
02
cW
Ktt MM ,
therefore 0)( MtH and MB
K tt . Note that
02
2)(
a
cWKgv
a
KtcWH ,
45
therefore the optimal cWt B
K .
Since ),( cWtt MB
K , the induced quantity supplied and the bribe charged are
),ˆ(2
ˆ FBMB
KB
K QQa
tcWQ
)ˆ,0(2
ˆ MB
KB
K ftcW
f
.
The total payment made by the central government is
a
cWKttQT
B
K
B
KB
K2
2)ˆ(
,
and the resulting deadweight loss is
02
2)(
8
)()(
2
,
a
cWKttgvgv
a
tcWtHWelfareDWLoss
B
K
B
K
B
KB
K
FBB
TK .
Note that tM is just a special case of B
Kt when 2
cWK
, i.e. )ˆ()ˆ(
2
B
cW
M QTQT . To prove that
)ˆ()ˆ( MB
K QTQT , it suffices to show that 0)ˆ(
dK
QdT B
K . By implicit function theorem, we can solve
for dK
dt B
K from equation
)22(22
2
cWKt
tcW
a
cWKttgv
B
K
B
K
B
K
B
K
. Specifically,
1
Bt
TA
BK
TA
dK
dt B
K where 0)22)((2 cWKtTgvA and 0)(4 TgvB . Finally,
1
)()ˆ(
Bt
TA
K
T
t
T
K
TB
dK
dt
t
T
K
T
dK
QdT B
K . Since 0
a
t
K
T, 0
2
22
a
cWKt
t
T and
02
2
a
KcW
t
T
K
T, it must be true that 0
)ˆ(
dK
QdT B
K and therefore )ˆ()ˆ( MB
K QTQT for all
46
2
cWK
.
Since B
Kt maximizes the function H(t), it must be true that )()( MB
K tHtH and
.2
)(8
)(
2
2)(
8
)()(
22
2
,
M
T
MM
MMMMFBB
TK
DWLossa
tgvgv
a
tcW
a
cWKttgvgv
a
tcWtHWelfareDWLoss
A.2 Comparative Statics in Proposition 4
Given that the optimal sensitive to pay tM is such that
)22(22
2
cWKt
tcW
a
cWKttgv
B
K
B
K
B
K
B
K
. By implicit function theorem, it is
straightforward to show that 0B
Ktda
d, 0B
KtdW
d, 0B
Ktdc
d, 0B
Ktdg
dand 0B
KtdK
d.
Given that
a
cWKttgvgv
a
tcWDWLoss
B
K
B
K
B
KB
TK2
2)(
8
)( 2
, , the signs of the
partial derivatives can be proved to be 0,
B
TK
K
DWLosst B
, 0,
B
TKDWLossa
,
0,
B
TKDWLossW
, 0,
B
TKDWLossc
, 0,
B
TKDWLossg
and 0,
B
TKDWLossK
. Intuitively,
since Mt minimizes deadweight loss, the first order condition ensures that 0,
B
TK
K
DWLosst B
.
Given that
a
cWKttQT
B
K
B
KB
K2
2)ˆ(
, it can be verified that 0)ˆ(
B
KB
K
QTt
,
0)ˆ(T
B
KQa
, 0)ˆ(T
B
KQW
, 0)ˆ(T
B
KQc
, 0)ˆ(T
B
KQg
and 0)ˆ(T
B
KQK
.
The total derivatives can then be calculated as follow,
47
B
TK
B
K
B
TKB
K
B
TK
B
TK DWLossx
tdx
dDWLoss
tDWLoss
xDWLoss
dx
d,,,,
and
B
K
B
KB
K
B
K
B
K tdx
dQT
tQT
xQT
dx
d)ˆ()ˆ()ˆ(
.
Plugging in the signs, it can then be verified that 0, B
TKDWLossda
d, 0
W, B
TKDWLossd
d,
0c
, B
TKDWLossd
d, 0, B
TKDWLossdg
d and 0, B
TKDWLossdK
d. Similarly, it can be verified that
0)ˆ( B
KQTda
d, 0)ˆ( B
KQTdg
d and 0)ˆ( B
KQTdK
d.
48
Table 1 Top 20 Economies in the World: GDP and Growth
GDP in 2014 (simple
exchange rates) GDP in 2014
(PPP*)
GDP growth:
1990-2014
(constant prices)
Per capita GDP
growth: 1990-2014**
(const. prices)
Rank Country
/Region
US$
billion
Country
/Region
Int’l
$ billion Country
/Region
Annual
growth
Country
/Region
Annual
growth
1 U.S. 17,419 China 17,617 China 9.8% China 9.0%
2 China 10,380 U.S. 17,419 Sudan 8.5% Sudan 6.7%
3 Japan 4,616 India 7,376 Vietnam 6.9% Vietnam 5.5%
4 Germany 3,860 Japan 4,751 Uganda 6.7% Sri Lanka 4.8%
5 U.K. 2,945 Germany 3,722 Nigeria 6.6% Korea 4.7%
6 France 2,847 Russia 3,565 India 6.5% India 4.7%
7 Brazil 2,353 Brazil 3,264 Ethiopia 6.4% Taiwan 4.4%
8 Italy 2,148 Indonesia 2,676 Angola 6.3% Nigeria 3.8%
9 India 2,050 France 2,581 Malaysia 6.0% Bangladesh 3.7%
10 Russia 1,857 U.K. 2,549 Sri Lanka 5.9% Chile 3.7%
11 Canada 1,789 Mexico 2,141 Ghana 5.6% Malaysia 3.7%
12 Australia 1,444 Italy 2,128 Korea 5.5% Ethiopia 3.6%
13 Korea 1,417 Korea 1,779 Bangladesh 5.5% Indonesia 3.6%
14 Spain 1,407 Saudi Arabia 1,606 Taiwan 5.1% Thailand 3.6%
15 Mexico 1,283 Canada 1,592 Indonesia 5.1% Uganda 3.3%
16 Indonesia 889 Spain 1,566 Tanzania 5.1% Poland 3.2%
17 Turkey 806 Turkey 1,508 Thailand 4.5% Ghana 3.0%
18 Saudi Arabia 752 Iran 1,334 Pakistan 4.4% Angola 3.0%
19 Nigeria 574 Australia 1,095 Saudi Arabia 4.4% Peru 2.8%
20 Poland 547 Taiwan 1,075 Iran 4.3% Iran 2.7%
Notes: * The PPP conversion factor is obtained from the World Bank Development Indicator (Table 5.6, World Bank. For details on
how to calculate the indicator, see “Handbook of the International Program.” United Nations, New York, 1992).
**: Countries with population less than 20 million or GDP less than USD20billion are excluded from this ranking.
49
Table 2 Transparency International – Bribe Payers’ Index (BPI)
This table shows the results of BPI, published by the Transparency International. The BPI is based on the responses of
business executives worldwide to questions about the extent to which foreign companies engage in bribery when doing
business in their country. The answers are converted to a score between 0 (bribes most frequent) to 10 (bribes never
occur), and the ranking of the leading economies, including all G20 countries for year 2006 and 2011, listed below
shows the average score of a country.
2011 2006
Country/ Region
Rank Score No. of respondents Rank Score No. of respondents
Netherlands 1 8.8 273 8 7.3 1,821
Switzerland 1 8.8 244 1 7.8 1,744
Belgium 3 8.7 221 9 7.2 1,329
Germany 4 8.6 576 7 7.3 3,873
Japan 4 8.6 319 11 7.1 3,279
Australia 6 8.5 168 3 7.6 1,447
Canada 6 8.5 209 5 7.5 1,870
Singapore 8 8.3 256 12 6.8 1,297
United Kingdom 8 8.3 414 6 7.4 3,442
United States 10 8.1 651 9 7.2 5,401
France 11 8.0 435 15 6.5 3,085
Spain 11 8.0 326 13 6.6 2,111
South Korea 13 7.9 152 21 5.8 1,930
Brazil 14 7.7 163 23 5.7 1,317
Hong Kong 15 7.6 208 18 6.0 1,556
Italy 15 7.6 397 20 5.9 2,525
Malaysia 15 7.6 148 25 5.6 1,319
South Africa 15 7.6 191 24 5.6 1,488
Taiwan 19 7.5 193 26 5.4 1,731
India 19 7.5 168 30 4.6 2,145
Turkey 19 7.5 139 27 5.2 1,755
Saudi Arabia 22 7.4 138 22 5.8 1,302
Argentina 23 7.3 115 N/A N/A N/A
United Arab Emirates 23 7.3 156 14 6.6 1,928
Indonesia 25 7.1 153 N/A N/A N/A
Mexico 26 7.0 121 17 6.5 1,765
China 27 6.5 608 29 4.9 3,448
Russia 28 6.1 172 28 5.2 2,203
No. of Countries 28 30
No. of Respondents 3,016 11,232
Average Score 7.8 6.4
Std. of Score 0.7 0.9
Min. Score 6.1 4.6
Max. Score 8.8 7.8
50
Table 3-A Corruption, Taxing Ability and Economic Growth
The Corruption Perception Index for a country is the average value (0 to 10; lower score means more corrupt) of
Transparency International from 1995 to 2014. GDP data, starting from 1980 to 2014, are all based on PPP (purchasing
power parity) and from IMF World Economic Outlook Database. Tax/GDP variable, starting from 1990 to 2014, is the
percentage of tax revenue over GDP and from World Bank.
Statistics
Corruption
Perception
Index
Tax/GDP
GDP Growth
Rate per year
(1981-2014)
Per Capita
GDP
(1981)
GDP per
capita
(2014)
More Corrupt Countries
(Above Median)
Mean 2.68 13% 6.65% 1,939 7,749
Stdev. 0.51 5% 2.50% 1,831 6,964
Less Corrupt Countries
(Below Median)
Mean 5.88 19% 5.97% 9,898 30,689
Stdev. 1.83 9% 1.67% 13,442 22,970
51
Table 3-B Corruption, Taxing Ability, and Economic Growth: An International Comparison
The Corruption Perception Index for a country is the average value (0 to 10; lower score means more corrupt) of Transparency International from 1995 to 2014.
GDP data, starting from 1980 to 2014, are all based on PPP (purchasing power parity) and from IMF World Economic Outlook Database. Tax/GDP variable,
starting from 1990 to 2014, is the percentage of tax revenue over GDP and from World Bank.
Country
Corruption
Perception Index Taxes/GDP
GDP Growth
Rate (1981-14)
Stdev. of GDP
Growth
Per Capita
GDP at 1981
Per Capita
GDP at 2014
GDP at 1981
(PPP billion)
GDP at 2014
(PPP billion)
Panel A More Corrupt Countries (Below Median)
Afghanistan 1.42 7% 10% 6% n/a 1,937 n/a 61
Myanmar 1.64 4% 12% 4% n/a 4,706 n/a 242
Sudan 1.68 6% 10% 12% 472 4,267 9 159
Equatorial Guinea 1.90 13% 19% 30% n/a 32,266 0 25
Nigeria 1.95 3% 8% 7% 1,454 6,031 102 1,049
Angola 1.98 26% 8% 9% 1,794 7,203 16 176
Bangladesh 1.99 7% 8% 1% 560 3,373 47 534
Congo Dem. Rep. 2.01 5% 4% 6% 656 704 20 56
Burundi 2.06 15% 5% 5% 449 911 2 8
Guinea 2.07 11% 6% 2% n/a 1,313 2 15
Cambodia 2.07 9% 10% 3% n/a 3,263 n/a 50
Tajikistan 2.11 9% 6% 9% n/a 2,688 n/a 22
Paraguay 2.13 11% 6% 5% 3,062 8,449 10 58
Kyrgyzstan 2.18 15% 4% 7% n/a 3,361 n/a 19
Azerbaijan 2.19 14% 8% 14% n/a 17,618 n/a 165
Cameroon 2.19 9% 6% 6% 1,457 2,981 13 67
Congo Rep. 2.19 7% 7% 6% 2,082 6,559 3 28
Kenya 2.20 17% 6% 3% 1,074 3,084 18 132
Central African Rep. 2.24 9% 3% 9% 587 607 1 3
Papua New Guinea 2.28 21% 7% 5% 750 2,399 2 18
Venezuela 2.29 14% 5% 7% 8,208 17,695 126 539
Yemen 2.29 10% 6% 4% n/a 3,774 n/a 104
Laos 2.33 13% 9% 4% 645 4,987 2 34
Cote d'Ivoire 2.35 14% 5% 4% 1,981 3,131 16 71
Pakistan 2.37 11% 8% 3% 980 4,736 83 882
Indonesia 2.42 14% 8% 4% 1,608 10,641 242 2,676
Ukraine 2.42 16% 1% 10% n/a 8,668 n/a 371
Sierra Leone 2.45 9% 5% 10% 1,117 2,027 3 13
Russia 2.45 15% 4% 7% n/a 24,805 n/a 3,565
Honduras 2.47 15% 6% 3% 1,588 4,729 6 39
Uganda 2.48 11% 9% 4% 415 2,023 5 77
Ecuador 2.55 16% 6% 4% 3,533 11,244 30 180
Zimbabwe 2.55 22% 1% 9% n/a 2,046 n/a 27
Kazakhstan 2.56 10% 6% 7% n/a 24,020 n/a 418
Nepal 2.58 9% 7% 3% 484 2,376 7 67
Iran 2.58 7% 7% 7% 4,756 17,114 194 1,334
52
Country
Corruption
Perception Index Taxes/GDP
GDP Growth
Rate (1981-14)
Stdev. of GDP
Growth
Per Capita
GDP at 1981
Per Capita
GDP at 2014
GDP at 1981
(PPP billion)
GDP at 2014
(PPP billion)
Panel A (Cont.) More Corrupt Countries (Below Median)
Togo 2.64 15% 5% 5% 953 1,450 2 10
Nicaragua 2.66 13% 5% 4% n/a 4,736 7 29
Maldives 2.68 13% 10% 6% 1,439 14,383 0 5
Bolivia 2.73 15% 6% 3% 2,186 6,221 12 70
Tanzania 2.75 12% 7% 2% 692 2,667 13 127
Niger 2.77 11% 5% 6% 574 1,048 3 18
Gambia 2.78 10% 6% 6% 614 1,599 0 3
Ethiopia 2.79 9% 8% 7% 334 1,589 12 145
Mozambique 2.81 19% 8% 6% 208 1,174 3 31
Philippines 2.85 14% 6% 4% 2,061 6,962 102 692
Lebanon 2.87 15% 6% 17% 6,724 17,986 17 81
Madagascar 2.87 10% 4% 4% 886 1,437 8 34
Guatemala 2.88 10% 6% 2% 3,252 7,503 21 119
Albania 2.89 14% 6% 8% 2,354 11,377 6 32
Moldova 2.91 17% 3% 9% n/a 4,979 n/a 18
Mali 2.95 15% 7% 4% 569 1,729 3 27
Armenia 2.96 16% 8% 8% n/a 7,374 n/a 24
Dominican Rep. 3.04 14% 7% 4% 2,791 13,012 16 138
Zambia 3.05 16% 6% 5% 1,777 4,064 10 61
Algeria 3.05 38% 6% 3% 5,025 14,259 97 552
Belarus 3.06 19% 6% 7% n/a 18,161 n/a 172
India 3.09 9% 9% 3% 643 5,855 448 7,376
Kiribati 3.10 16% 4% 4% 998 1,713 0 0
Liberia 3.10 0% 6% 10% n/a 882 n/a 4
Benin 3.11 16% 6% 3% 710 1,870 3 20
Argentina 3.14 11% 5% 6% 6,411 22,583 181 948
Egypt 3.16 16% 7% 3% 2,320 10,877 97 943
Mongolia 3.21 15% 8% 6% n/a 11,882 3 35
Vanuatu 3.26 18% 6% 4% 1,050 2,608 0 1
Senegal 3.34 19% 6% 3% 913 2,311 5 34
Sao Tome & Principe 3.35 14% 5% 4% 1,452 3,153 0 1
China 3.36 10% 13% 3% 343 12,880 343 17,617
Mexico 3.37 10% 5% 4% 6,351 17,881 462 2,141
Bosnia & Herzegovina 3.37 21% 6% 4% n/a 9,833 n/a 38
Thailand 3.37 16% 8% 5% 1,758 14,354 84 986
Burkina Faso 3.37 13% 8% 3% 363 1,682 3 29
Romania 3.41 14% 4% 6% 5,220 19,712 118 393
Sri Lanka 3.42 15% 8% 3% 1,171 10,372 17 217
Colombia 3.43 13% 6% 3% 3,041 13,430 88 640
Georgia 3.44 14% 8% 4% n/a 7,653 n/a 34
Grenada 3.45 20% 6% 5% 2,017 11,979 0 1
Panama 3.45 12% 8% 5% 3,605 19,455 7 76
53
Country
Corruption
Perception Index Taxes/GDP
GDP Growth
Rate (1981-14)
Stdev. of GDP
Growth
Per Capita
GDP at 1981
Per Capita
GDP at 2014
GDP at 1981
(PPP billion)
GDP at 2014
(PPP billion)
Panel B Less Corrupt Countries (Above Median)
Macedonia 3.51 18% 4% 4% n/a 13,349 n/a 28
Suriname 3.52 20% 4% 4% n/a 16,623 2 9
Jamaica 3.56 26% 4% 4% 3,263 8,609 7 24
Belize 3.57 20% 8% 6% 1,491 8,248 0 3
Serbia 3.59 21% 5% 4% n/a 13,329 n/a 95
Morocco 3.59 23% 7% 5% 1,605 7,606 32 252
Brazil 3.76 14% 5% 3% 4,927 16,096 598 3,264
Lesotho 3.77 45% 7% 3% 494 2,764 1 5
El Salvador 3.79 13% 5% 3% 2,057 8,021 10 51
Bulgaria 3.79 19% 4% 6% 5,338 17,860 47 129
Ghana 3.79 15% 8% 3% 883 4,129 9 108
Peru 3.80 14% 6% 6% 3,531 11,817 63 371
Turkey 3.91 20% 7% 5% 3,956 19,610 171 1,508
Rwanda 3.92 11% 7% 11% 473 1,698 2 19
Trinidad and Tobago 3.92 25% 5% 6% n/a 32,139 9 43
Croatia 3.94 21% 4% 5% n/a 20,889 n/a 88
Fiji 4.00 22% 5% 5% 2,312 8,236 2 7
Latvia 4.22 9% 5% 7% n/a 23,707 n/a 48
Slovakia 4.25 14% 6% 4% n/a 28,175 n/a 153
Greece 4.34 20% 4% 4% 9,602 25,859 93 284
Samoa 4.43 0% 5% 4% n/a 5,180 0 1
Italy 4.55 22% 4% 3% 11,607 35,486 656 2,128
Kuwait 4.55 1% 7% 19% 28,390 71,020 41 284
Tunisia 4.58 20% 7% 3% 2,394 11,300 16 124
Czech Rep. 4.64 15% 4% 4% n/a 29,925 n/a 315
Poland 4.65 17% 5% 3% 4,607 25,105 165 954
Seychelles 4.71 28% 7% 5% 4,756 25,607 0 2
South Africa 4.77 25% 5% 3% 5,297 13,046 155 705
Namibia 4.77 26% 7% 3% n/a 10,765 n/a 24
Lithuania 4.84 54% 7% 6% n/a 27,051 n/a 80
Jordan 4.84 19% 7% 6% 4,557 11,927 11 80
Korea 4.84 14% 10% 5% 2,520 35,277 98 1,779
Mauritius 4.93 19% 8% 3% 2,050 18,553 2 23
Malaysia 4.98 16% 9% 5% 3,664 24,654 52 746
Hungary 5.04 22% 4% 4% 7,075 24,942 76 246
Costa Rica 5.04 14% 7% 3% n/a 14,864 8 71
Bahrain 5.31 1% 7% 3% 18,168 51,714 7 62
Oman 5.32 5% 8% 6% 9,738 39,681 14 162
Cape Verde 5.40 20% 8% 4% 899 6,324 0 3
Dominica 5.53 22% 6% 4% n/a 10,800 0 1
Bhutan 5.74 8% 11% 5% 574 7,641 0 6
Malta 5.87 44% 4% 2% n/a 33,216 n/a 14
54
Country
Corruption
Perception Index Taxes/GDP
GDP Growth
Rate (1981-14)
Stdev. of GDP
Growth
Per Capita
GDP at 1981
Per Capita
GDP at 2014
GDP at 1981
(PPP billion)
GDP at 2014
(PPP billion)
Panel B (Cont.) Less Corrupt Countries (Above Median)
Botswana 5.98 24% 10% 6% 1,897 16,036 2 34
Slovenia 6.06 19% 5% 4% n/a 29,658 n/a 61
Uruguay 6.06 18% 5% 4% 4,628 20,556 14 70
Cyprus 6.08 40% 7% 4% 7,008 30,769 4 27
Estonia 6.21 17% 6% 7% n/a 26,999 n/a 36
St. Vincent and the
Grenadines 6.27 23% 6% 4% 1,757 10,778 0 1
United Arab Emirates 6.30 0% 7% 8% 81,045 64,479 89 600
Spain 6.31 13% 5% 3% 8,570 33,711 323 1,566
Portugal 6.33 20% 5% 4% 6,747 26,975 66 280
Qatar 6.47 20% 9% 10% 71,815 143,427 19 321
Israel 6.57 25% 7% 3% 7,870 32,691 31 268
Belgium 6.90 25% 5% 2% 11,958 42,973 118 481
France 6.93 21% 5% 2% 11,830 40,375 639 2,581
Saint Lucia 7.02 23% 6% 6% 2,386 11,594 0 2
Japan 7.12 10% 5% 4% 9,655 37,390 1,135 4,751
Chile 7.15 18% 7% 5% 3,925 22,971 45 409
Bahamas 7.15 14% 5% 4% 9,292 25,049 2 9
Barbados 7.30 26% 4% 3% 5,972 16,183 1 5
United States 7.47 10% 5% 3% 13,966 54,597 3,211 17,419
Ireland 7.65 25% 7% 4% 8,406 49,195 29 227
Austria 7.76 19% 5% 2% 12,173 46,420 92 395
Hong Kong SAR 7.87 12% 8% 5% 7,952 54,722 41 398
Germany 7.91 11% 4% 3% 12,261 45,888 949 3,722
United Kingdom 8.24 26% 5% 2% 9,436 39,511 532 2,549
Luxembourg 8.48 25% 7% 4% 16,865 92,049 6 51
Australia 8.62 23% 6% 2% 11,696 46,433 176 1,095
Norway 8.72 27% 5% 2% 16,574 66,937 68 345
Canada 8.75 14% 5% 3% 12,840 44,843 318 1,592
Netherlands 8.78 21% 5% 2% 12,657 47,355 180 799
Switzerland 8.79 10% 4% 2% 18,821 58,087 119 473
Iceland 8.95 24% 5% 4% 12,022 43,637 3 14
Singapore 9.10 14% 10% 5% 10,202 82,762 26 453
Sweden 9.18 21% 5% 3% 11,827 45,986 98 448
New Zealand 9.39 30% 5% 3% 10,247 35,152 32 159
Finland 9.40 21% 5% 4% 10,637 40,347 51 221
Denmark 9.465 32% 4% 3% 12,518 44,343 64 250
55
Table 4 Industry Compositions in the Most Corrupt Countries
Source of data in the table is World Development Indicators 1990-2010 (World Bank). The industrial origin of value added is determined by the International
Standard Industrial Classification (ISIC) revision 3. ‘Agriculture’ corresponds to ISIC divisions 1–5 and includes forestry and fishing; ‘Industry’ covers mining,
manufacturing (also reported separately), construction, electricity, water, and gas (ISIC divisions 10–45); and ‘Services’ correspond to ISIC divisions 50–99; this
sector is derived as a residual (from GDP less agriculture and industry) and may not properly reflect the sum of services output, including banking and financial
services. Manufacturing corresponds to industries belonging to ISIC divisions 15–37.
Country
Agriculture
(% of GDP)
Services
(% of GDP)
Industry
(% of GDP)
Food,
beverages &
tobacco (% of
manufacturing)
Textiles &
clothing (% of
manufacturing)
Machinery &
transport
equipment (% of
manufacturing)
Chemicals
(% of
manufacturing)
Other (% of
manufacturing)
1990 2010 1990 2010 1990 2010 1990 2010 1990 2010 1990 2010 1990 2010 1990 2010
Algeria 11 9 40 40 48 51 13 46 17 4 – 19 10 11 60 20
Argentina 8 8 56 61 36 31 20 – 10 – 10 – 12 – 49 –
China 27 10 32 44 41 46 15 – 15 – 16 – 13 – 42 –
Congo 31 23 40 42 29 34 – – – – – – – – – –
Egypt 19 14 52 48 29 38 19 16 15 6 6 4 14 15 46 59
Ethiopia 52 45 38 45 10 10 62 – 21 – 1 – 2 – 14 –
India 29 18 44 55 26 27 12 10 15 9 17 19 14 15 42 48
Indonesia 19 14 41 42 39 44 27 23 15 10 9 22 9 14 40 30
Kenya 30 28 51 51 19 21 38 31 10 4 5 3 9 6 38 57
Nigeria 32 24 23 54 45 22 – – – – – – – – – –
Russia 17 4 35 61 48 35 – 17 – 2 – 10 – 10 – 61
Venezuela 5 6 34 42 61 52 17 – 5 – 3 – 9 – 66 –
Germany 2 1 61 69 38 30 – 8 – 1 – 40 – 11 – 40
Japan 2 1 60 71 38 28 9 13 5 2 25 27 10 12 52 47
U.S. 2 1 70 79 28 20 12 – 5 – 23 – 12 – 48 –
56
Figure 1. Comparing Perfect Bertrand Competition and Monopoly
Figure 2. Imperfect Bertrand Competition with Transaction Costs
Price (user fee)
P(Q)=W-aQ
Q QM QFB 0
PFB
PFB + fM
MC(Q)=c
MR(Q) DWLossM
Price (user fee)
P(Q)=W-aQ
Q B
KQ QFB 0
PFB
PFB + K
MC(Q)=c
MR(Q)
B
KDWLoss