A Cameron-Storvick type theorem on Ca,b2[0,T] with applications

Abstract

The purpose of this paper is to establish a very general Cameron-Storvick theorem involving the generalized analytic Feynman integral of functionals on the product function space Ca,b2[0,T]. The function space Ca,b[0,T] can be induced by the generalized Brownian motion process associated with continuous functions a and b. To do this we first introduce the class FA1,A2\,\,a,b of functionals on Ca,b2[0,T] which is a generalization of the Kallianpur and Bromley Fresnel class FA1,A2. We then proceed to establish a Cameron-Storvick type theorem on the product function space Ca,b2[0,T]. Finally we use our Cameron--Storvick type theorem to obtain several meaningful results and examples.