Weighted q approximation problems on the ball and on the sphere

Abstract

Let Lq,μ,\, 1 q<∞, \ μ0, denote the weighted Lq space with the classical Jacobi weight wμ on the ball Bd. We consider the weighted least q approximation problem for a given Lq,μ-Marcinkiewicz-Zygmund family on Bd. We obtain the weighted least q approximation errors for the weighted Sobolev space Wq,μr, r>(d+2μ)/q, which are order optimal. We also discuss the least squares quadrature induced by an L2,μ-Marcinkiewicz-Zygmund family, and get the quadrature errors for W2,μr, r>(d+2μ)/2, which are also order optimal. Meanwhile, we give the corresponding the weighted least q approximation theorem and the least squares quadrature errors on the sphere.