Approximation by boolean sums of Jackson operators on the sphere

Abstract

This paper concerns the approximation by the Boolean sums of Jackson operators rJk,s(f) on the unit sphere Sn-1 of Rn. We prove the following the direct and inverse theorem for rJk,s(f): there are constants C1 and C2 such that equation* C1\|rJk,sf-f\|p ≤ ω2r(f,k-1)p ≤ C2 v≥ k\|rJk,sf-f\|p equation* for any positive integer k and any pth Lebesgue integrable functions f defined on Sn-1, where ω2r(f,t)p is the modulus of smoothness of degree 2r of f. We also prove that the saturation order for rJk,s is k-2r.