CHAPTER 4
Applications of Stochastic Calculus to Finance
4.1. RISK PREMIUM DERIVATION
The following is a very surprising result. For a single Wiener process driving a market, there is a universal risk premium (or price of risk). Consider two derivatives of this driver that trade in this market,
dS1 = S1µ1 dt + S1σ1 dz(t),
dS2 = S2µ2 dt + S2σ2 dz(t),
where the drift and volatilities may be arbitrary functions of time and their respective stocks. We may think of security 1 as an option and security 2 as a stock. Note that they are perfectly correlated because the Wiener process is the same for each security (admittedly, this is not a very realistic model of a market). There may be an infinite number of different securities from which to choose the two securities.
Construct a portfolio that is long one security and short Δ shares of the other:
Π = S1 − ΔS2.
LONG AND SHORT
Long is a finance term meaning to own an amount. Short means to effectively own a negative amount. The latter is realized in the capital markets by borrowing a fungible security and immediately selling it—and then buying it back at a later date and returning this under the borrow agreement. Fungible means securities for which this transaction is allowed.
Now consider the process for this portfolio:
dΠ = dS1 − ΔdS2
= (µ1S1 − Δµ2S2) dt + (σ1S1 − Δσ2S2) dz(t).
Carefully note that the number of shares of security 2 that we are short—that is, Δ —may be chosen as a function of time and stock price to ensure that ...
Get The Mathematics of Derivatives: Tools for Designing Numerical Algorithms now with the O’Reilly learning platform.
O’Reilly members experience books, live events, courses curated by job role, and more from O’Reilly and nearly 200 top publishers.
