Showing total 2 results

1. STRONG APPROXIMATION BY FOURIER-LAPLACE SERIES ON THE UNIT SPHERE Sn − 1.

Author

Brown, G., Dai, F., and Móricz, F.

Subjects

*SPHERES, *SOLID geometry, *APPROXIMATION theory, *FUNCTIONAL analysis, *MATHEMATICAL functions, *COMPLEX numbers, *MATHEMATICS

Abstract

We study the strong approximation properties of the Cesáro means of order δ of the Fourier-Laplace expansion of functions integrable on the unit sphere Sn-1, where δ &gT; λ := (n - 2)/2, the latter being the critical index for Cesáo summability of Fourier-Laplace series on Sn-1. The main purpose of this paper is to extend known results from the unit circle S1 to the general sphere Sn-1 with n &gT; 3. We prove six theorems. To prove Theorems 1–3, our machinery is based on the equieonvergent operator ENδ(f) of the Cesáro means σNδ (f) on Sn-1 introduced by Wang Kunyang for δ > -1. We prove in Theorem 6 that ENδ(f) is also equiconvergent with σNδ(f) for δ > 0 in the case of strong approximation. To prove Theorems 4 and 5, we rely on known equivalence relations between K-functionals and moduli of continuity. [ABSTRACT FROM AUTHOR]

Published

2004

2. STRONG APPROXIMATION BY FOURIER-LAPLACE SERIES ON THE UNIT SPHERE Sn − 1.

Author

Brown, G., Dai, F., and Móricz, F.

Subjects

SPHERES, SOLID geometry, APPROXIMATION theory, FUNCTIONAL analysis, MATHEMATICAL functions, COMPLEX numbers, MATHEMATICS

Abstract

We study the strong approximation properties of the Cesáro means of order δ of the Fourier-Laplace expansion of functions integrable on the unit sphere Sn-1, where δ &gT; λ := (n - 2)/2, the latter being the critical index for Cesáo summability of Fourier-Laplace series on Sn-1. The main purpose of this paper is to extend known results from the unit circle S1 to the general sphere Sn-1 with n &gT; 3. We prove six theorems. To prove Theorems 1–3, our machinery is based on the equieonvergent operator ENδ(f) of the Cesáro means σNδ (f) on Sn-1 introduced by Wang Kunyang for δ > -1. We prove in Theorem 6 that ENδ(f) is also equiconvergent with σNδ(f) for δ > 0 in the case of strong approximation. To prove Theorems 4 and 5, we rely on known equivalence relations between K-functionals and moduli of continuity. [ABSTRACT FROM AUTHOR]

Published

2004