Post on 28-Dec-2015
Is the Stock Market Predictable?
Suppose that Prof. Chen Nan had discovered that stock prices are predictable.
Investors could reap unending profits simply by purchasing stocks that were about to increase and by selling stocks about to fall.
A moment reflection should convince yourself that this is not true.
Is the Stock Market Predictable?
For example, suppose my model predicts that stock XYZ will rise dramatically in three days to $110 from $100.
The prediction must induce a great wave of immediate buy orders.
Huge demands on stock XYZ will push its price to jump to $110 immediately.
Is the Stock Market Predictable?
Any forecast of a future price increase will lead to an immediate price increase.
In other words, any information that could be used to predict stock performance must already be reflected in stock prices.
The genuine driving force behind is new information or unpredictable information.
Efficient Market Hypothesis and Random Walk
Efficient market hypothesis (EMH) : Maurice Kendall (1953), Harry Roberts (1959), Eugene Fama (1965) Weak form:
Stock prices already reflect all information that can be derived by examining market trading data.
Strong form: Stock prices reflect all information relevant
to the firm, even including information available only to the company insiders.
Efficient Market Hypothesis and Random Walk
Under EMH, stock prices should follow a random walk, that is, price changes should be random and unpredictable.
Simplest model of random walk: Flipping a coin Number facing up, then one step
right; Flower facing up, then one step left.
Implication of EMH
Technical analysis: The search for recurrent and predictable patterns in stock prices.
EMH implies that technical analysis is without merit.
Implication of EMH
Fundamental analysis: Attempts to determine “proper”
stock prices using basic information such as earnings and dividend prospects of a firm, expectations of future interest rates, and risk evaluation, etc.
EMH implies that most of such analysis is doomed to failure.
Stock Price as a Random Walk
Imagine that an “invisible hand” is tossing a coin to decide the movement of a stock.
For example, the current stock price is $100. After 1 year, the stock price either goes up to $110 with probability 55%, or goes down to $90 with probability 45%.
Option Pricing on Binomial Model
Suppose that I have a European call option on the stock in the last slide. The maturity is in 1 year and the strike price is $100. How do I evaluate its current value?
$110, 55% Call: $10
$90, 45% Call: 0
Option Pricing on Binomial Model
Idea: Can we construct a portfolio which
consists only of known securities to “duplicate” the behavior of the option?
In other words, if we can duplicate the cash flow of the option by another portfolio using only bank account and the underlying stock, then we can do.
Option Pricing on Binomial Model
Suppose I deposit (or borrow) in a bank account and buy shares of the stock: Up:
Down:
Option Pricing on Binomial Model
Duplicating:
Evaluation: The option price should be equal
to the current value of the portfolio:
Option Pricing on Binomial Model
Risk neutral probability:
We can regard the formula in this way:
The value of an option is the present value of the expected cash flow at the maturity, only it is not the “real expectation”.
Where Did the Real Probability Go?
Real probability plays no role in the option pricing formula.
Why not the following?
Risk and risk premium
Options on Cum Dividend Stocks
Suppose that the dynamic of the underlying stock is :
Su, p
S Sd, 1-p
The time to maturity is t and a dividend amount of D is expected at s.
Options on Foreign Currencies
Suppose that the Australian dollar is currently worth US$0.654. The risk free interest rates are 7% and 5% annually in Australia and the United States, respectively.
A US investor wants to buy a call option on the AUD with strike price of US$0.65. The maturity is in 3 month.
More Realistic Extension:Binomial Tree Model
In theory, there should be infinite possible outcomes for the underlying stock price.
One step binomial tree is too simple to be a good approximation to the real world.
Extension: multiple step binomial model.
More Realistic Extension:Binomial Tree Model
For example, instead of regarding 1 year as one step, we divide it into many steps. Su2
Su
S Sud
Sd Sd2
Valuing Back down the Tree
Suppose that we have a stock whose current price is $20 per share. We want to consider a European call option with strike price of $21 and maturity date in 6 month. The risk free interest rate is 12% per annum.
Two step binomial tree: 3 months as a step. In every step the price may go up by 10% or down by 10%.
Valuing Back down the Tree
Work backward to value the option:
$24.2
$22
$20 $19.8
$18 $16.2
$3.2
$0.0
$0.0
$2.0257
$0.0
$1.2823
American Option Pricing and Early Exercise
Suppose that the previous option is American style, that is, we can exercise it any time before it matures.
How can we evaluate it?
American Option Pricing and Early Exercise
Suppose that we have a stock whose current price is $50 per share.
We want to consider an American put option with strike price of $52 and maturity date in 2 years. The risk free interest rate is 5% per annum.
Two step binomial tree: 1 year as a step. In every step the price may go up by 20% or down by 20%.
American Option Pricing and Early Exercise
Work forward to label the stock prices:
$72
$60
$50 $48
$40 $32
Valuing Back down the Tree
Work backward to value the option:
$72
$60
$50 $48
$40 $32
$0
$4
$20
$1.4147
$9.4636
$5.0894
$0
$12
$2