Optimal quadrature for weighted function spaces on multivariate domains
Abstract
Consider the numerical integration Int Sd,w(f)=∫ Sdf( x)w( x) dσ( x) for weighted Sobolev classes BWp,wr( Sd) with a Dunkl weight w and weighted Besov classes BBγ(Lp,w( Sd)) with the generalized smoothness index and a doubling weight w on the unit sphere Sd of the Euclidean space Rd+1 in the deterministic and randomized case settings. For BWp,wr( Sd) we obtain the optimal quadrature errors in both settings. For BBγ(Lp,w( Sd)) we use the weighted least p approximation and the standard Monte Carlo algorithm to obtain upper estimates of the quadrature errors which are optimal if w is an A∞ weight in the deterministic case setting or if w is a product weight in the randomized case setting. Our results show that randomized algorithms can provide a faster convergence rate than that of the deterministic ones when p>1. Similar results are also established on the unit ball and the standard simplex of Rd.
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