TY - JOUR UR - http://lib.ugent.be/catalog/pug01:1260618 ID - pug01:1260618 LA - eng TI - On the point behavior of Fourier series and conjugate series PY - 2010 JO - (2010) ZEITSCHRIFT FUR ANALYSIS UND IHRE ANWENDUNGEN SN - 0232-2064 PB - 2010 AU - Estrada, Ricardo AU - Vindas Diaz, Jasson WE16 802000645185 0000-0002-3789-8577 AB - We investigate the point behavior of periodic functions and Schwartz distributions when the Fourier series and the conjugate series are both Abel summable at a point. In particular we show that if f is a bounded function and its Fourier series and conjugate series are Abel summable to values gamma and beta at the point theta(0), respectively, then the primitive of f is differentiable at theta(0), with derivative equal to gamma, the conjugate function satisfies lim(theta ->theta 0) 3/(theta-theta(0))(3) integral(theta)(theta 0) (f) over tildet (theta - t)(2) dt = beta, and the Fourier series and the conjugate series are both (C, kappa) summable at theta(0), for any kappa > 0. We show a similar result for positive measures and L-1 functions bounded from below. Since the converse of our results are valid, we therefore provide a complete characterization of simultaneous Abel summability of the Fourier and conjugate series in terms of "average point values", within the classes of positive measures and functions bounded from below. For general L-1 functions, we also give a.e. distributional interpretation of -1/2 pi p.v. integral(pi)(-pi) f(t + theta(0)) cott/2 dt as the point value of the conjugate series when viewed as a distribution.We obtain more general results of this kind for arbitrary trigonometric series with coefficients of slow growth, i.e., periodic distributions. ER -Download RIS file
00000nam^a2200301^i^4500 | |||
001 | 1260618 | ||
005 | 20190215143107.0 | ||
008 | 110612s2010------------------------eng-- | ||
022 | a 0232-2064 | ||
024 | a 000285565100008 2 wos | ||
024 | a 1854/LU-1260618 2 handle | ||
024 | a 10.4171/ZAA/1420 2 doi | ||
040 | a UGent | ||
245 | a On the point behavior of Fourier series and conjugate series | ||
260 | c 2010 | ||
520 | a We investigate the point behavior of periodic functions and Schwartz distributions when the Fourier series and the conjugate series are both Abel summable at a point. In particular we show that if f is a bounded function and its Fourier series and conjugate series are Abel summable to values gamma and beta at the point theta(0), respectively, then the primitive of f is differentiable at theta(0), with derivative equal to gamma, the conjugate function satisfies lim(theta ->theta 0) 3/(theta-theta(0))(3) integral(theta)(theta 0) (f) over tildet (theta - t)(2) dt = beta, and the Fourier series and the conjugate series are both (C, kappa) summable at theta(0), for any kappa > 0. We show a similar result for positive measures and L-1 functions bounded from below. Since the converse of our results are valid, we therefore provide a complete characterization of simultaneous Abel summability of the Fourier and conjugate series in terms of "average point values", within the classes of positive measures and functions bounded from below. For general L-1 functions, we also give a.e. distributional interpretation of -1/2 pi p.v. integral(pi)(-pi) f(t + theta(0)) cott/2 dt as the point value of the conjugate series when viewed as a distribution.We obtain more general results of this kind for arbitrary trigonometric series with coefficients of slow growth, i.e., periodic distributions. | ||
598 | a A1 | ||
700 | a Estrada, Ricardo | ||
700 | a Vindas Diaz, Jasson u WE16 0 802000645185 0 0000-0002-3789-8577 9 2150C3A8-F0EE-11E1-A9DE-61C894A0A6B4 | ||
650 | a Mathematics and Statistics | ||
653 | a asymptotic behavior of generalized functions | ||
653 | a Tauberian theorems | ||
653 | a Abel and Cesaro summability | ||
653 | a pointwise behavior | ||
653 | a distributions | ||
653 | a Hilbert transform | ||
653 | a conjugate series | ||
653 | a Fourier series | ||
653 | a distributional point values | ||
773 | t ZEITSCHRIFT FUR ANALYSIS UND IHRE ANWENDUNGEN g Z. Anal. ihre Anwend. 2010. 29 (4) p.487-504 q 29:4<487 | ||
856 | 3 Full Text u https://biblio.ugent.be/publication/1260618/file/1264605 z [open] y BehaviorFourierConjugateSeries.pdf | ||
920 | a article | ||
Z30 | x WE 1 WE01* | ||
922 | a UGENT-WE |
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