L\'evy area for Gaussian processes: A double Wiener-It\o integral approach

Abstract

Let \X1(t)\0≤ t≤1 and \X2(t)\0≤ t≤1 be two independent continuous centered Gaussian processes with covariance functionsR1 and R2. This paper shows that if the covariance functions are of finite p-variation and q-variation respectively and such that p-1+q-1>1,then the L\'evy area can be defined as a double Wiener--It\`o integral with respect to an isonormal Gaussian process induced by X1 and X2. Moreover, some properties of the characteristic function of that generalised L\'evy area are studied.