Algebraic structure of the L2 analytic Fourier-Feynman transform associated with Gaussian processes on Wiener space

Abstract

In this paper we study algebraic structures of the classes of the L2 analytic Fourier-Feynman transforms on Wiener space. To do this we first develop several rotation properties of the generalized Wiener integral associated with Gaussian processes. We then proceed to analyze the L2 analytic Fourier-Feynman transforms associated with Gaussian processes. Our results show that these L2 analytic Fourier--Feynman transforms are actually linear operator isomorphisms from a Hilbert space into itself. We finally investigate the algebraic structures of these classes of the transforms on Wiener space, and show that they indeed are group isomorphic.