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Some sharp estimates for the second continuity modulus for periodic functions and for functions extended from A segment. / Vinogradov, O. L.

In: Journal of Mathematical Sciences , Vol. 92, No. 1, 1998, p. 3560-3572.

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Harvard

Vinogradov, OL 1998, 'Some sharp estimates for the second continuity modulus for periodic functions and for functions extended from A segment', Journal of Mathematical Sciences , vol. 92, no. 1, pp. 3560-3572. https://doi.org/10.1007/BF02440140

APA

Vinogradov, O. L. (1998). Some sharp estimates for the second continuity modulus for periodic functions and for functions extended from A segment. Journal of Mathematical Sciences , 92(1), 3560-3572. https://doi.org/10.1007/BF02440140

Vancouver

Vinogradov OL. Some sharp estimates for the second continuity modulus for periodic functions and for functions extended from A segment. Journal of Mathematical Sciences . 1998;92(1):3560-3572. https://doi.org/10.1007/BF02440140

Author

Vinogradov, O. L. / Some sharp estimates for the second continuity modulus for periodic functions and for functions extended from A segment. In: Journal of Mathematical Sciences . 1998 ; Vol. 92, No. 1. pp. 3560-3572.

BibTeX

@article{9a0060da92464f92b4f5b859a93b8584,
title = "Some sharp estimates for the second continuity modulus for periodic functions and for functions extended from A segment",
abstract = "Let C be the space of 2π-periodic continuons real functions with the uniform norm, let Hn be the set of trigonometric polynomials of order not more than n, let ω2(f) be the second continuity modulus for a function f ∈ C, and let Tn(f) be the best approximation polynomial of order n for f ∈ C. Set A0(f) = 1/2π ∫-ππ f; /; U : C - C; C(U,h) = sup f∈C ||U(f) - ||/ω2(f, h), In this paper, for h sufficiently large we find the values C(U,h) for some positive operators U. For example, C(A0, h) and C(T0, h) are found. For n = 1, 2, 3 we find the values C(U, π/n + 1) for some linear positive operators U : C → Hn. We establish relations between C(T0, h) and exact constants in the inequality ω2(f, h1) ≤ C(h1, h)ω2(f, h) for some h and h1 such that 0 < h < h1 < π. For a seminorm P invariant with respect to the shift and majorized by the uniform norm, analogs of C(U, h) are estimated from above. We investigate the problem of extension of a function defined on a segment with preservation of the second continuity modulus. The relation (Matrix equation presented) is established. Here the segment X contains I = [0, 1] as a proper subset, and ω2 (f, X, h) is the second continuity modulus for f on X with step h. Bibliography: 5 titles.",
author = "Vinogradov, {O. L.}",
year = "1998",
doi = "10.1007/BF02440140",
language = "English",
volume = "92",
pages = "3560--3572",
journal = "Journal of Mathematical Sciences",
issn = "1072-3374",
publisher = "Springer Nature",
number = "1",

}

RIS

TY - JOUR

T1 - Some sharp estimates for the second continuity modulus for periodic functions and for functions extended from A segment

AU - Vinogradov, O. L.

PY - 1998

Y1 - 1998

N2 - Let C be the space of 2π-periodic continuons real functions with the uniform norm, let Hn be the set of trigonometric polynomials of order not more than n, let ω2(f) be the second continuity modulus for a function f ∈ C, and let Tn(f) be the best approximation polynomial of order n for f ∈ C. Set A0(f) = 1/2π ∫-ππ f; /; U : C - C; C(U,h) = sup f∈C ||U(f) - ||/ω2(f, h), In this paper, for h sufficiently large we find the values C(U,h) for some positive operators U. For example, C(A0, h) and C(T0, h) are found. For n = 1, 2, 3 we find the values C(U, π/n + 1) for some linear positive operators U : C → Hn. We establish relations between C(T0, h) and exact constants in the inequality ω2(f, h1) ≤ C(h1, h)ω2(f, h) for some h and h1 such that 0 < h < h1 < π. For a seminorm P invariant with respect to the shift and majorized by the uniform norm, analogs of C(U, h) are estimated from above. We investigate the problem of extension of a function defined on a segment with preservation of the second continuity modulus. The relation (Matrix equation presented) is established. Here the segment X contains I = [0, 1] as a proper subset, and ω2 (f, X, h) is the second continuity modulus for f on X with step h. Bibliography: 5 titles.

AB - Let C be the space of 2π-periodic continuons real functions with the uniform norm, let Hn be the set of trigonometric polynomials of order not more than n, let ω2(f) be the second continuity modulus for a function f ∈ C, and let Tn(f) be the best approximation polynomial of order n for f ∈ C. Set A0(f) = 1/2π ∫-ππ f; /; U : C - C; C(U,h) = sup f∈C ||U(f) - ||/ω2(f, h), In this paper, for h sufficiently large we find the values C(U,h) for some positive operators U. For example, C(A0, h) and C(T0, h) are found. For n = 1, 2, 3 we find the values C(U, π/n + 1) for some linear positive operators U : C → Hn. We establish relations between C(T0, h) and exact constants in the inequality ω2(f, h1) ≤ C(h1, h)ω2(f, h) for some h and h1 such that 0 < h < h1 < π. For a seminorm P invariant with respect to the shift and majorized by the uniform norm, analogs of C(U, h) are estimated from above. We investigate the problem of extension of a function defined on a segment with preservation of the second continuity modulus. The relation (Matrix equation presented) is established. Here the segment X contains I = [0, 1] as a proper subset, and ω2 (f, X, h) is the second continuity modulus for f on X with step h. Bibliography: 5 titles.

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U2 - 10.1007/BF02440140

DO - 10.1007/BF02440140

M3 - Article

AN - SCOPUS:54649083888

VL - 92

SP - 3560

EP - 3572

JO - Journal of Mathematical Sciences

JF - Journal of Mathematical Sciences

SN - 1072-3374

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