An optimal approximation of Rosenblatt sheet by multiple Wiener integrals

Abstract

Let Zα,β be the Rosenblatt sheet with the representation Zα,β(t,s)=∫t0∫s0∫t0∫s0Qα(t,y1,y2)Qβ(s,u1,u2)B(dy1,du1)B(dy2,du2) where B is a Brownian sheet, 12<α,β<1, Qα and Qβ are the given kernel. In this paper, we contruct multiple Wiener integrals of the form align* ∫t0∫s0∫t0∫s0&[k1(y1,y2)-12α(u1,u2)-12β+k2(y1 y2)12α(y1 y2)-12α|y1-y2|α-1\\ &·(u1 u2)12β(u1 u2)-12β|u1-u2|β-1]B(dy1,du1)B(dy2,du2),~~k1,k2≥0, align* and obtain an optimal approximation of Zα,β(t,s).