Optimal approximation rate of certain stochastic integrals

Abstract

Given an increasing function H:[0,1) [0,∞) and An(H):=∈fτ∈ Tn(Σi=1n ∫ti-1ti (ti-t)H2(t)dt)1/2, where Tn:=\τ=(ti)i=0n: 0=t0<t1<...<tn=1\, we characterize the property An(H)≤ cn, and give conditions for An(H)≤ cnβ and An(H)≥ 1cnβ for β∈ (0,1), both in terms of integrability properties of H. These results are applied to the approximation of certain stochastic integrals.