Optimal quadrature errors and sampling numbers for Sobolev spaces with logarithmic perturbation on spheres

Abstract

In this paper, we study optimal quadrature errors, approximation numbers, and sampling numbers in L2( Sd) for Sobolev spaces Hα,β( Sd) with logarithmic perturbation on the unit sphere Sd in Rd+1. First we obtain strong equivalences of the approximation numbers for Hα,β( Sd) with α>0, which gives a clue to Open problem 3 as posed by Krieg and Vyb\'iral in KV. Second, for the optimal quadrature errors for Hα,β( Sd), we use the "fooling" function technique to get lower bounds in the case α>d/2, and apply Hilbert space structure and Vyb\'iral's theorem about Schur product theory to obtain lower bounds in the case α=d/2,\,β>1/2 of small smoothness, which confirms the conjecture as posed by Grabner and Stepanyukin in GS and solves Open problem 2 in KV. Finally, we employ the weighted least squares operators and the least squares quadrature rules to obtain approximation theorems and quadrature errors for Hα,β( Sd) with α>d/2 or α=d/2,\,β>1/2, which are order optimal.