A Topological Approach to Mapping Space Signatures

Abstract

A common approach for describing classes of functions and probability measures on a topological space X is to construct a suitable map from X into a vector space, where linear methods can be applied to address both problems. The case where X is a space of paths [0,1] Rn and is the path signature map has received much attention in stochastic analysis and related fields. In this article we develop a generalized for the case where X is a space of maps [0,1]d Rn for any d ∈ N, and show that the map generalizes many of the desirable algebraic and analytic properties of the path signature to d 2. The key ingredient to our approach is topological; in particular, our starting point is a generalisation of K-T Chen's path space cochain construction to the setting of cubical mapping spaces.