On stochastic calculus with respect to q-Brownian motion

Abstract

Following the approach and the terminology introduced in [A. Deya and R. Schott, On the rough paths approach to non-commutative stochastic calculus, J. Funct. Anal., 2013], we construct a product L\'evy area above the q-Brownian motion (for q∈ [0,1)) and use this object to study differential equations driven by the process.We also provide a detailled comparison between the resulting "rough" integral and the stochastic "It\o" integral exhibited by Donati-Martin in [C. Donati-Martin, Stochastic integration with respect to q Brownian motion, Probab. Theory Related Fields, 2003].