Integration with respect to the non-commutative fractional Brownian motion

Abstract

We study the issue of integration with respect to the non-commutative fractional Brownian motion, that is the analog of the standard fractional Brownian in a non-commutative probability setting.When the Hurst index H of the process is stricly larger than 1/2, integration can be handled through the so-called Young procedure. The situation where H=1/2 corresponds to the specific free case, for which an It\o-type approach is known to be possible.When H<1/2, rough-path-type techniques must come into the picture, which, from a theoretical point of view, involves the use of some a-priori-defined L\'evy area process. We show that such an object can indeed be canonically constructed for any H∈ (14,12). Finally, when H≤ 1/4, we exhibit a similar non-convergence phenomenon as for the non-diagonal entries of the (classical) L\'evy area above the standard fractional Brownian.