Approximation and quadrature by weighted least squares polynomials on the sphere
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Given a sequence of Marcinkiewicz-Zygmund inequalities in L_2 on a usual compact space ℳ, Gröchenig introduced the weighted least squares polynomials and the least squares quadrature from pointwise samples of a function, and obtained approximation theorems and quadrature errors. In this paper we obtain approximation theorems and quadrature errors on the sphere which are optimal. We also give upper bounds of the operator norms of the weighted least squares operators.
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