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VII. ARBITRAGE AND HEDGING WITH FIXED INCOME
INSTRUMENTS AND CURRENCIES
A. Arbitrage with Riskless Bonds
• Riskless bonds can be replicated with portfolios of other riskless bonds if their payments are and made on the same dates.
• Consider Bond D, a 3-year, 20% coupon bond selling for $1360.
BOND CURRENT
PRICE FACE
VALUE COUPON
RATE YEARS TO MATURITY
A 1000 1000 .04 2
B 1055.5 1000 .06 3
C 889 1000 0 3
200 = 40bA + 60bB + 0bC 200 = 1040bA + 60bB + 0bC 1200 = 1060bB + 1000bC
333333.2
333333.3
0
=
C
B
A
b
b
b
=
001.00070667.018373.
00006667.0173333.
0001.001.
1200
200
200
B. Fixed Income Hedging
• Fixed income instruments provide for fixed interest payments at fixed intervals and principal repayments.
• In the absence of default and liquidity risk (and hybrid or adjustable features), uncertainties in interest rate shifts are the primary source of pricing risk for many fixed income instruments.
Bond Yields and Sources of Risk
• A bond maturing in n periods with a face value of F pays interest annually at a rate of c with yield y.
• In general, bond risk might be categorized as follows:– Default or credit risk: the bond issuer may not fulfill all of its obligations– Liquidity risk: there may not exist an efficient market for investors to
resell their bonds– Interest rate risk: market interest rate fluctuations affect values of
existing bonds.
n
tnt y
F
y
cFPV
1 )1()1(
2210 )12.1(
1000
)12.1(
100
)12.1(
10020.966
P
Fixed Income Portfolio Dedication
• Assume that a fund needs to make payments of $12,000,000 in one year, $14,000,000 in two years, and $15,000,000 in three years.
12,000,000 = 40bA + 60bB + 0bC 14,000,000 = 1040bA + 60bB + 0bC 15,000,000 = 1060bB + 1100bC
67.195586
67.198666
2000
=
C
B
A
b
b
b
=
001.00070667.018373.
00006667.0173333.
0001.001.
000,000,15
000,000,14
000,000,12
C. Fixed Income Portfolio Immunization
• Bonds, particularly those with longer terms to maturity are subject to market value fluctuations after they are issued, primarily due to changes in interest rates offered on new issues.
• Generally, interest rate increases on new bond issues decrease values of bonds that are already outstanding; interest rate decreases on new bond issues increase values of bonds that are already outstanding.
• Immunization models such as the duration model are intended to describe the proportional change in the value of a bond induced by a change in interest rates or yields of new issues.
Bond Duration• Bond duration measures the proportional sensitivity of a bond to changes
in the market rate of interest.
n
tnt
t
y
F
y
cFPV
1 )1()1(
PV
y
yd
dPV
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PV
dPVDur
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nt ynFytcFyd
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Dur
Portfolio Immunization
• Immunization strategies are concerned with matching present values of asset portfolios with present values of cash flows associated with future liabilities.
• The simple duration immunization strategy assumes:– Changes in (1 + y) are infinitesimal.– The yield curve is flat (yields do not vary over terms to
maturity).– Yield curve shifts are parallel; that is, short- and long-
term interest rates change by the same amount.– Only interest rate risk is significant.
Immunization Illustration• Assume a flat yield curve, such that all yields to maturity equal 4%. • The fund manager has anticipated cash payouts of $12,000,000,
$14,000,000 and $15,000,000.• The flat yield curve of 4% implies a value for the liability stream is
$37,816,120.• We calculate bond and liability durations:
DurA = 401+0.04+2× 1040ሺ1+0.04ሻ2−1000 = -1.96
DurB = 601+0.04+2× 60ሺ1+0.04ሻ2+3× 1060
ሺ1+0.04ሻ3−1055.5 = -2.84
DurC = 3× 1000ሺ1+0.04ሻ3−889 = -3
DurL = 12,000,0001+0.04 +2×14,000,000ሺ1+0.04ሻ2 +3×15,000,000
ሺ1+0.04ሻ3−37,817.193.9 = -1.97
Duration and Immunization• Portfolio immunization is accomplished when the duration of the portfolio of bonds equals
the duration (-1.97):
DurA ∙ wA + DurB ∙ wB + DurC ∙ wC = DurL
wA + wB + wC = 1
-1.96 ∙ wA – 2.84 ∙ wB – 2.84 ∙ wC = -1.97
wA + wB + wC = 1
• There are an infinity of solutions to this two-equation, three variable system. • Next, suppose that the manager already has invested $3,781,612 (10% of the total liability
value) into Bond A constant at wA = .1. We solve for investment weights as follows:
w = Dur-1 s
742164.
157836.
1.
=
C
B
A
w
w
w
=
82208.486037.17132.
17792.513963.171321.
100
1.0
1
97486.1
Convexity
• The first two derivatives can be used in a second order Taylor series expansion to approximate new bond prices induced by changes in interest rates as follows: 2
0001 )]1([)1(''!2
1)]1([)1( yyfyyfPP
2010
2
12
0
2
20
2
11
01
001
][2
1][
][)1(
)(
)1(
)(
2
1
][)1()1(
0
0 yconvexityPyDurP
yy
Fnn
y
cFtt
yy
nF
y
tcFPP
yP
n
tnt
n
tnt
0
2
2
12
2
)1(
)(
)1(
)(
P
y
Fnn
y
cFttn
n
tt
Convexity
Convexity Illustration
ConvA = 2× 40ሺ1+0.04ሻ3+6× 1040
ሺ1+0.04ሻ41000 = 5.41
ConvB = 2× 60ሺ1+0.04ሻ3+6× 60
ሺ1+0.04ሻ4+12× 1060ሺ1+0.04ሻ5−1055.5 = 10.30
ConvC = 12× 1000ሺ1+0.04ሻ5−889 = 11.09 ConvL = 2×12,000,000
ሺ1+0.04ሻ3 +6×14,000,000ሺ1+0.04ሻ4 +12×15,000,000
ሺ1+0.04ሻ5−37,816.120 = 6.38
Duration, Convexity and Immunization
• Portfolio immunization is accomplished when the duration and the convexity of the portfolio of bonds equals the duration and convexity (6.38) of the liability stream:
DurA ∙ wA + DurB ∙ wB + DurC ∙ wC = Duro
ConvA ∙ wA + ConvB ∙ wB + ConvC ∙ wC = Convo
wA + wB + wC = 1
-1.962 ∙ wA – 2.837 ∙ wB – 3 ∙ wC = -1.975
5.41 ∙ wA + 10.30 ∙ wB + 11.09 ∙ wC = 6.38
wA + wB + wC = 1
• The single solution to this 3 X 3 system of equations is wA = -0.481, wB = 9.358 and wC = -7.877. This system provides an improved immunization strategy when interest rate changes are finite.
D. Term Structure, Interest Rate Contracts and Hedging
• The Pure Expectations Theory:
• The Yield Curve can be bootstrapped
n
ttt
nn yy
1,1,0 )1()1(
1)1(
1,1,0
n
n
tttn yy
0 2 4 6 8 10 12 14 16 18
0.00%
1.00%
2.00%
3.00%
4.00%
5.00%
6.00%
Years
Sp
ot
Rat
e
Simultaneous Estimation of Discount Functions
• Three coupon bonds are trading at known prices. Bond yields or spot rates must be determined simultaneously to avoid associating contradictory rates for the annual coupons on each of the three bills.
BOND CURRENT PRICE
FACE VALUE
COUPON RATE
YEARS TO MATURITY
E 947.376 1000 .05 2
F 904.438 1000 .06 3
G 981 1000 .09 3
002.003.0
00177.00181667.001.
0371.03815.001.
981
438.904
376.947
=
3
2
1
D
D
D
=
751316.
85734.
943377.
CF-1 P0 = d
Spot and Forward Rates• Spot rates are as follows:
• Forward rates are as follows:
1,0
1
06.11
yD
2,0
2
1
2
08.11
y
D
3,0
3
1
3
10.11
y
D
10.1
)06.1(
)08.1( 2
2,1
y
14.1
)10.1)(06.1(
)10.1( 3
3,2
y
12.1
)06.1(
)10.1( 3
3,1 y
E. Arbitrage with Currencies• Triangular arbitrage exploits the relative price difference between one currency and two other
currencies. • Suppose the buying and selling prices of EUR 1 is USD 1.2816. However, the South African
Rand (SFR) has a price (buying or selling) equal to USD 0.2000 or EUR 0.1600.• Since USD 0.20 = EUR 0.16, dividing both figures by 0.16 implies that USD1.25 = EUR1. • But, this is inconsistent with the currency price information given above, which states that
USD1.2816 = EUR1.0. • In terms of the SFR, it appears that the USD is too strong relative to the EUR, so we will start
by selling USD0.20 for SFR1 as per the price given above. We will cover the short position in USD by selling EUR0.16, which actually nets us .16 ∙ USD 1.2816 = USD0.2051. We will cover our short position in EUR by selling SFR at the price listed above.
USD SFR EUR
Sell USD0.20 for SFR1 -0.2000 +1.0000
Sell EUR0.16 for USD0.2051 +0.2051 - 0.1600
Sell SFR1.0 for EUR0.16 -1.0000 +0.1600
Totals +0.0051 0 0
Parity and Arbitrage in FX Markets
1. Purchase Power Parity (PPP)
2. Interest Rate Parity (IRP)
3. Forward rates equal expected spot rates
4. The Fisher Effect
5. The International Fisher effect.
Collectively, these conditions are often referred to as the International Equilibrium Model.