The Approximation of Functions of Several Variables with Bounded p-Fluctuation by Polynomials in the Walsh System

Akhazhanov, Talgat; Matin, Dauren; Baituyakova, Zhuldyz

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dc.contributor.author	Akhazhanov, Talgat
dc.contributor.author	Matin, Dauren
dc.contributor.author	Baituyakova, Zhuldyz
dc.date.accessioned	2026-03-12T09:18:53Z
dc.date.available	2026-03-12T09:18:53Z
dc.date.issued	2024
dc.identifier.citation	Akhazhanov, T.; Matin, D.; Baituyakova, Z. The Approximation of Functions of Several Variables with Bounded p-Fluctuation by Polynomials in the Walsh System. Mathematics 2024, 12, 3899. https:// doi.org/10.3390/math12243899	ru
dc.identifier.issn	2227-7390
dc.identifier.other	doi.org/10.3390/math12243899
dc.identifier.uri	http://repository.enu.kz/handle/enu/30219
dc.description.abstract	This paper presents direct and inverse theorems concerning the approximation of functions of several variables with bounded p-fluctuation using Walsh polynomials. These theorems provide estimates for the best approximation of such functions by polynomials in the norm of the space under consideration. The paper investigates the properties of the Walsh system, which includes piecewise constant functions, and builds on earlier work on trigonometric and multiplicative systems. The results are theoretical and have potential applications in such areas as coding theory, digital signal processing, pattern recognition, and probability theory.	ru
dc.language.iso	en	ru
dc.publisher	Mathematics	ru
dc.relation.ispartofseries	12, 3899;
dc.subject	functions of bounded p-fluctuation	ru
dc.subject	Walsh system	ru
dc.subject	direct and converse theorems	ru
dc.subject	discrete modulus of continuity	ru
dc.title	The Approximation of Functions of Several Variables with Bounded p-Fluctuation by Polynomials in the Walsh System	ru
dc.type	Article	ru