Path integrals for fractional Brownian motion and fractional Gaussian noise

Baruch Meerson, Olivier Bénichou, Gleb Oshanin

Published 2022-09-23Version 1

The Wiener's path integral played a major role in the studies of Brownian motion (Bm). Here we derive exact path-integral representations for the more general \emph{fractional} Brownian motion (fBm) and for its time derivative process -- the fractional Gaussian noise (fGn). These paradigmatic non-Markovian stochastic processes found numerous applications across the disciplines, ranging from anomalous diffusion in cellular environments to mathematical finance. Still, exact path-integral representations for the fBm and fGn were previously unknown. Our formalism exploits the Gaussianity of the fBm and fGn, relies on theory of singular integral equations and overcomes some technical difficulties by representing the action functional for the fBm in terms of the fGn for the sub-diffusive fBm, and in terms of the first derivative of the fGn for the super-diffusive fBm. We also extend the formalism to include external forcing. The path-integral representations open a new avenue in the studies of the fBm and fGn,just as the Wiener's path integral did for the standard Bm.