Quadratic covariations for the solution to a stochastic heat equation

Abstract

Let u(t,x) be the solution to a stochastic heat equation ∂∂ tu=12∂2∂ x2u+∂2∂ t∂ xX(t,x), t≥ 0, x∈ R with initial condition u(0,x) 0, where X is a time-space white noise. This paper is an attempt to study stochastic analysis questions of the solution u(t,x). In fact, the solution is a Gaussian process such that the process t u(t,·) is a bi-fractional Brownian motion seemed a fractional Brownian motion with Hurst index H=14 for every real number x. However, the properties of the process x u(·,x) are unknown. In this paper we consider the quadratic covariations of the two processes x u(·,x),t u(t,·). We show that x u(·,x) admits a nontrivial finite quadratic variation and the forward integral of some adapted processes with respect to it coincides with "It\o's integral", but it is not a semimartingale. Moreover, some generalized It\o's formulas and Bouleau-Yor identities are introduced.