Expected uniform integration approximation under general equal measure partition

Abstract

In this paper, we study bounds of expected L2-discrepancy to give mean square error of uniform integration approximation for functions in Sobolev space H1(K), where H is a reproducing Hilbert space with kernel K. Better order O(N-1-1d) of approximation error is obtained, comparing with previously known rate O(N-1) using crude Monte Carlo method. Secondly, we use expected Lp-discrepancy bound(p 1) of stratified samples to give several upper bounds of p-moment of integral approximation error in general Sobolev space Fd,q*.

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