Portfolios Generated by Contingent Claim Functions, with Applications to Option Pricing

Abstract

This paper presents a synthesis of the theories of portfolio generating functions and option pricing. The theory of portfolio generation is extended to measure the value of portfolios generated by positive C2,1 functions of asset prices X1,... , Xn directly, rather than with respect to a numeraire portfolio. If a portfolio generating function satisfies a specific partial differential equation, then the value of the portfolio generated by that function will replicate the value of the function. This differential equation is a general form of the Black-Scholes equation. Similar results apply to contingent claim functions, which are portfolio generating functions that are homogeneous of degree 1. With the addition of a riskless asset, an inhomogeneous portfolio generating function V : R+n x [0, T] R+ can be extended to an equivalent contingent claim function V : R+ x R+n x [0, T] R+ that generates the same portfolio and is replicable if and only if V is replicable. Several examples are presented.