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The Arbitrage Theorem

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The Arbitrage Theorem Henrik J nsson M lardalen University Sweden Contents Necessary conditions European Call Option Arbitrage Arbitrage Pricing Risk-neutral ... – PowerPoint PPT presentation

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Title: The Arbitrage Theorem


1
The Arbitrage Theorem
  • Henrik Jönsson
  • Mälardalen University
  • Sweden

2
Contents
  • Necessary conditions
  • European Call Option
  • Arbitrage
  • Arbitrage Pricing
  • Risk-neutral valuation
  • The Arbitrage Theorem

3
Necessary conditions
  • No transaction costs
  • Same risk-free interest rate r for borrowing
    lending
  • Short positions possible in all instruments
  • Same taxes
  • Momentary transactions between different assets
    possible

4
European Call Option
  • C - Option Price
  • K - Strike price
  • T - Expiration day
  • Exercise only at T
  • Payoff function, e.g.

5
Arbitrage
The Law of One Price In a competitive market,
if two assets are equivalent, they will tend to
have the same market price.
6
Arbitrage
  • Definition
  • A trading strategy that takes advantage of two or
    more securities being mispriced relative to each
    other.
  • The purchase and immediate sale of equivalent
    assets in order to earn a sure profit from a
    difference in their prices.

7
Arbitrage
  • Two portfolios A B have the same value at tT
  • No risk-less arbitrage opportunity ?
  • They have the same value at any time t?T

8
Arbitrage Pricing
  • The Binomial price model

0?d?u
0?q?1
9
Arbitrage Pricing
r risk-free interest rate
d lt (1r) lt u
  • 1r lt d
  • 1r gt u

Action at time 0 t0 tT
Borrow S -(1r)S
Buy stock -S dS
Return 0 gt0
Action at time 0 t0 tT
Lend -S (1r)S
Sell stock S -uS
Return 0 gt0
10
Arbitrage Pricing
  • Equivalence portfolio
  • Call option

(tT)
(t0)
r risk-free interest rate
11
Arbitrage Pricing
  • Choose ? and B such that

12
Arbitrage Pricing
13
Risk-neutral valuation
Expected rate of return (1r)
( p equivalent martingale probability )
  • p risk-neutral probability

14
Risk-neutral valuation
  • Expected present value of the return 0

Price of option today Expected present value of
option at time T
C (1r)-1pCu (1-p)Cd
Risk-neutral probability p
( p equivalent martingale probability )
15
The Arbitrage Theorem
  • Let X?1,2,,m be the outcome of an experiment
  • Let p (p1,,pm), pj PXj, for all j1,,m
  • Let there be n different investment opportunities
  • Let ? (?1,, ?n) be an investment strategy (?i
    pos., neg. or zero for all i)

16
The Arbitrage Theorem
  • Let ri(j) be the return function for a unit
    investment on investment opportunity i

17
The Arbitrage Theorem
  • If the outcome Xj then

18
The Arbitrage Theorem
  • Exactly one of the following is true Either
  • there exists a probability vector p (p1,,pm)
    for which
  • or
  • b) there is an investment strategy ? (?1,,
    ?m) for which

19
The Arbitrage Theorem
  • Proof Use the Duality Theorem of Linear
    Programming

Primal problem
Dual problem
  • If x primal feasible y dual feasible then
  • cTx bTy
  • x primal optimum y dual optimum
  • If either problem is infeasible, then the other
    does not have an optimal solution.

20
The Arbitrage Theorem
  • Proof (cont.)

Primal problem
Dual problem
21
The Arbitrage Theorem
Proof (cont.)
  • Dual feasible iff y probability vector
    under which all investments have the expected
    return 0
  • Primal feasible when ?i 0, i1,, n,

cT? bTy 0 ? Optimum! No sure win is
possible!
22
The Arbitrage Theorem
  • Example
  • Stock (S0) with two outcomes
  • Two investment opportunities
  • i1 Buy or sell the stock
  • i2 Buy or sell a call option (C)

23
The Arbitrage Theorem
  • Return functions
  • i1
  • i2

24
The Arbitrage Theorem
  • Expected return
  • i1
  • i2

25
The Arbitrage Theorem
  • (1) and the Arbitrage theorem gives
  • (2), (3) the Arbitrage theorem gives the
    non-arbitrage option price

(3)
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