A complete asymptotic expansion for the quasi-interpolants of Gauss–Weierstrass operators

2 years ago

(original), Approximation Theory, not-at-ICTP, paper

Abstract

We derive the complete asymptotic expansion for the quasiinterpolants of Gauss Weierstrass operators $W_{n}$ and their left quasi interpolants $W_{n}^{[r]}$ with explicit representation of the coefficients. The results apply to all locally integrable real functions $f$ on $\mathbb{R}$ satisfying the growth condition $f(t)=O\left(e^{ct^{2}}\right)\$ as $\ |t|\rightarrow+\infty$ , for some $c>0$ . All expansions are shown to be valid also for simultaneous approximation.

Authors

U. Abel

Octavian Agratini
Department of Mathematics, Babes-Bolyai University, Cluj-Napoca, Romania

R. Păltănea

Keywords

Approximation by integral operators, rate of convergence, degree of approximation, asymptotic expansions.

Paper coordinates

U. Abel, O. Agratini, R. Păltănea, A complete asymptotic expansion for the quasi-interpolants of Gauss–Weierstrass operators, Mediterranean Journal of Mathematics 15 (2018), pp. 154-156, https://doi.org/10.1007/s00009-018-1195-8

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About this paper

Journal

Mediteranean Journal of Mathematics

Publisher Name

Springer

DOI

https://doi.org/10.1007/s00009-018-1195-8

Print ISSN

1660-5446

Online ISSN

1660-5454

google scholar link

2018