Approximation of entire function solutions of the Helmholtz equation having slow growth

Devendra Kumar

doi:10.1515/jaa-2012-0012

Back

Approximation of entire function solutions of the Helmholtz equation having slow growth

Journal article

Peer reviewed

Approximation of entire function solutions of the Helmholtz equation having slow growth

Devendra Kumar

Journal of applied analysis, Vol.18(2), pp.179-196

01/12/2012

DOI: https://doi.org/10.1515/jaa-2012-0012

Abstract

Mathematics

Mathematics, Applied

Physical Sciences

Science & Technology

In this paper, we study the Chebyshev polynomial approximation of entire solutions of Helmholtz equations in R-2 in Banach spaces (B(p, q, m) space, Hardy space and Bergman space). Some bounds on generalized order of entire solutions of Helmholtz equations of slow growth have been obtained in terms of the coefficients and approximation errors using function theoretic methods.

Metrics

1 Record Views

Details

Title: Approximation of entire function solutions of the Helmholtz equation having slow growth
Creators - without role: Devendra Kumar - Department of Mathematics, M. M. H. College, Model Town, Ghaziabad 201001 U.P., India
Publication Details: Journal of applied analysis, Vol.18(2), pp.179-196
Publisher: Walter De Gruyter
Number of pages: 18
Identifiers: 9912165508331
Academic Unit: Al Baha University
Language: English
Resource Type: Journal article