Martingales and Path-Dependent PDEs via Evolutionary Semigroups

Abstract

In this article, we develop a semigroup-theoretic framework for the analytic characterisation of martingales with path-dependent terminal conditions. Our main result establishes that a measurable adapted process of the form \[ V(t) - ∫0t(s)\, ds \] is a martingale with respect to an expectation operator E if and only if a time-shifted version of V is a mild solution of a final value problem involving a path-dependent differential operator that is intrinsically connected to E. We prove existence and uniqueness of strong and mild solutions for such final value problems with measurable terminal conditions using the concept of evolutionary semigroups. To characterise the compensator , we introduce the notion of E-derivative of V, which in special cases coincides with Dupire's time derivative. We also compare our findings to path-dependent partial differential equations in terms of Dupire derivatives such as the path-dependent heat equation.