On the Finite Dimensional Joint Characteristic Function of L\'evy's Stochastic Area Processes

Abstract

The goal of this paper is to derive a formula for the finite dimensional joint characteristic function (the Fourier transform of the finite dimensional distribution) of the coupled process (Wt,LtA):t∈ 0,∞), where \Wt:t∈ 0,∞) is a d-dimensional Brownian motion and \LtA:t∈ 0,∞) is the generalized d-dimensional Levy's stochastic area process associated to a d× d matrix A. Here A need not be skew-symmetric, and in our computation we allow A to vary. The problem finally reduces to the solution of a recursive system of symmetric matrix Riccati equations and a system of independent first order linear matrix ODEs. As an example, the two dimensional L\'evy's stochastic area process is studied in detail.