Chapter 4: Ten Different Ways to Derive Black–Scholes 255
Martingales
The martingale pricing methodology was formalized
by Harrison and Kreps (1979) and Harrison and Pliska
(1981).^1We start again withdSt=μSdt+σSdWtTheWtis Brownian motion with measureP. Now intro-
duce a new equivalent martingale measureQsuch thatW ̃t=Wt+ηt,whereη=(μ−r)/σ.UnderQwe havedSt=rS dt+σSdW ̃t.IntroduceGt=e−r(T−t)E
Q
t[max(ST−K,0)].
The quantityer(T−t)Gtis aQ-martingale and sod(
er(T−t)Gt)
=αter(T−t)GtdW ̃tfor some processαt. Applying Ito’s lemma,ˆdGt=(r+αη)Gtdt+αGtdWt.This stochastic differential equation can be rewritten
as one representing a strategy in which a quantity
αGt/σSof the stock and a quantity (G−αGt/σ)er(T−t)(^1) If my notation changes, it is because I am using the notation
most common to a particular field. Even then the changes are
minor, often just a matter of whether one puts a subscriptton
adWfor example.