Stochastic Quantization for the Edwards Measure of Fractional Brownian Motion with Hd=1

Abstract

In this paper we construct a Markov process which has as invariant measure the fractional Edwards measure based on a d-dimensional fractional Brownian motion, with Hurst index H in the case of Hd=1. We use the theory of classical Dirichlet forms. However since the corresponding self-intersection local time of fractional Brownian motion is not Meyer-Watanabe differentiable in this case, we show the closability of the form via quasi translation invariance of the fractional Edwards measure along shifts in the corresponding fractional Cameron-Martin space.