The covariation for Banach space valued processes and applications

Abstract

This article focuses on a new concept of quadratic variation for processes taking values in a Banach space B and a corresponding covariation. This is more general than the classical one of M\'etivier and Pellaumail. Those notions are associated with some subspace of the dual of the projective tensor product of B with itself. We also introduce the notion of a convolution type process, which is a natural generalization of the It\o process and the concept of 0-semimartingale, which is a natural extension of the classical notion of semimartingale. The framework is the stochastic calculus via regularization in Banach spaces. Two main applications are mentioned: one related to Clark-Ocone formula for finite quadratic variation processes; the second one concerns the probabilistic representation of a Hilbert valued partial differential equation of Kolmogorov type.