Existence and explicit form of nonlinear Hermite-Chebyshev approximations
A. P. Starovoitov, I. V. Kruglikov
TL;DR
This paper establishes conditions for the existence of nonlinear Hermite-Chebyshev approximations of Fourier series-representable functions and provides explicit formulas for these approximations.
Contribution
It introduces new sufficient conditions for the existence of nonlinear Hermite-Chebyshev approximations and derives explicit formulas for their computation.
Findings
Conditions for existence of approximations are identified.
Explicit formulas for approximations are derived.
Applicable to functions representable by Fourier series in Chebyshev polynomials.
Abstract
In this paper, sufficient conditions for the existence of trigonometric Hermite-Jacobi appro\-ximations of a system of functions that are sums of convergent Fourier series are found. Based on these results, sufficient conditions are established under which nonlinear Hermite-Chebyshev approximations of systems of functions representable by Fourier series in Chebyshev polynomials of the first and second kind exist. When the found conditions are met, explicit formulas are obtained for the numerators and denominators of trigonometric Hermite-Jacobi approximations and nonlinear Hermite-Chebyshev approximations of the first and second kind of the specified systems of functions.
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Taxonomy
TopicsIterative Methods for Nonlinear Equations · Mathematical functions and polynomials · Approximation Theory and Sequence Spaces