The quadratic covariation for a weighted fractional Brownian motion

Abstract

Let Ba,b be a weighted fractional Brownian motion with indices a,b satisfying a>-1,-1<b<0,|b|<1+a. In this paper, motivated by the asymptotic property E[(Ba,bs+-Ba,bs)2] =O(1+b) 1+a+b=E[(Ba,b)2] ( 0) for all s>0, we consider the generalized quadratic covariation [f(Ba,b),Ba,b](a,b) defined by [f(Ba,b),Ba,b](a,b)t= 01+a+b1+b∫t+ \f(Ba,bs+) -f(Ba,bs)\(Ba,bs+-Ba,bs)sbds, provided the limit exists uniformly in probability. We construct a Banach space H of measurable functions such that the generalized quadratic covariation exists in L2() and the generalized Bouleau-Yor identity [f(Ba,b),Ba,b](a,b)t=-1(1+b) B(a+1,b+1) ∫ Rf(x) La,b(dx,t) holds for all f∈ H, where La,b(x,t)=∫0tδ(Ba,bs-x)ds1+a+b is the weighted local time of Ba,b and B(·,·) is the Beta function.