On regularity properties of Bessel flow

Abstract

We study the differentiability of Bessel flow : x xt, where ( xt)t≥ 0 is BES x(δ ) process of dimension δ >1 starting from x. For δ ≥ 2 we prove the existence of bicontinuous derivatives in P-a.s. sense at x≥ 0 and we study the asymptotic behaviour of the derivatives at x=0. For 1< δ <2 we prove the existence of a modification of Bessel flow having derivatives in probability sense at x≥ 0. We study the asymptotic behaviour of the derivatives at t=τ0(x) where τ0(x) is the first zero of ( xt)t≥ 0.