On Jackson s Inequality for a Generalized Modulus of Continuity in L 2

Abstract

We study Jackson's inequality between the best approximation of a function f ∈ L ₂(ℝ³) by entire functions of exponential spherical type and its generalized modulus of continuity. We prove Jackson's inequality with the exact constant and the optimal argument in the modulus of continuity. In particular, Jackson's inequality with the optimal parameters is obtained for classical modulus of continuity of order r and Thue–Morse modulus of continuity of order r ∈ ℕ. These results are based on the solution of the generalized Logan problem for entire functions of exponential type. For it we construct a new quadrature formulas for entire functions of exponential type.

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Authors and Affiliations

1. Department of Applied Mathematics and Computer Science, Tula State University, pr. Lenin 92, Tula, 300012, Russia

   Valerii Ivanov & Alexey Ivanov

Corresponding author

Correspondence to Valerii Ivanov.

Additional information

Supported by the Russian Foundation for Basic Research (Grant No. 16-01-00308)

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Cite this article

Ivanov, V., Ivanov, A. Generalized Logan's Problem for Entire Functions of Exponential Type and Optimal Argument in Jackson's Inequality in L ₂(ℝ³). Acta. Math. Sin.-English Ser. 34, 1563–1577 (2018). https://doi.org/10.1007/s10114-018-4437-6

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• Received: 16 July 2014

• Revised: 08 January 2015

• Accepted: 11 January 2018

• Published: 28 April 2018

• Issue Date: October 2018

• DOI : https://doi.org/10.1007/s10114-018-4437-6

Keywords

• Best approximation
• generalized modulus of continuity
• Jackson's inequality
• optimal argument
• Logan's problem
• quadrature formula

MR(2010) Subject Classification

• 30D20
• 41A17
• 41A44

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Source: https://link.springer.com/article/10.1007/s10114-018-4437-6

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