Approximation of analytic functions by generalized discrete shifts of the Lerch zeta-function

In the paper, we consider approximation of analytic functions by discrete shifts L ( λ , α , s + ψ ( k )), k ∈ N 0 = N ∪ 0 , of the Lerch zeta-function,where ψ is an increasing to +∞ real differentiable function with monotonic derivative satisfying some growth conditions and such that the sequence {...

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Bibliographic Details
Published in:Lithuanian mathematical journal Vol. 65; no. 2; pp. 254 - 270
Main Authors: Laurinčikas, Antanas, Mikalauskaitė, Toma, Šiaučiūnas, Darius
Format: Journal Article
Language:English
Published: New York Springer US 01.04.2025
Springer Nature B.V
Subjects:
Actuarial Sciences
Analytic functions
Approximation
Estimates
Hypotheses
Inequality
Mathematical analysis
Mathematics
Mathematics and Statistics
Number Theory
Ordinary Differential Equations
Probability Theory and Stochastic Processes
Theorems
approximation of analytic functions
weak convergence of probability measures
Lerch zeta-function
11M35
universality of zeta-functions
Hurwitz zeta-function
ISSN:0363-1672, 1573-8825
Online Access:Get full text
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Summary:In the paper, we consider approximation of analytic functions by discrete shifts L ( λ , α , s + ψ ( k )), k ∈ N 0 = N ∪ 0 , of the Lerch zeta-function,where ψ is an increasing to +∞ real differentiable function with monotonic derivative satisfying some growth conditions and such that the sequence { aψ ( k ): k ∈ N }, a ≠ 0, is uniformly distributed modulo 1. We obtain that the set of above shifts approximating every analytic function from a certain set has a positive lower density.
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ISSN:0363-1672
1573-8825
DOI:10.1007/s10986-025-09679-x