JAMING, Philippe; SPECKBACHER, Michael

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JAMING, Philippe
Institut de Mathématiques de Bordeaux [IMB]

SPECKBACHER, Michael
Institut de Mathématiques de Bordeaux [IMB]

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Illinois Journal of Mathematics. 2020, vol. 64, p. 467-479

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In this paper, we show that the expansions of functions from $L^p$-Paley-Wiener type spaces in terms of the prolate spheroidal wave functions converge almost everywhere for $1<p<\infty$, even in the cases when they might not converge in $L^p$-norm. We thereby consider the classical Paley-Wiener spaces $PW_c^p\subset L^p(\R)$ of functions whose Fourier transform is supported in $[-c,c]$ and Paley-Wiener like spaces $B_{\al,c}^p\subset L^p(0,\infty)$ of functions whose Hankel transform $\H^\al$ is supported in $[0,c]$.As a side product, we show the continuity of the projection operator $P_c^\al f:=\H^\al(\chi_{[0,c]}\cdot \H^\al f)$ from $L^p(0,\infty)$ to $L^q(0,\infty)$, $1<p\leq q<\infty$.< Leer menos

Palabras clave en inglés

Prolate spheroidal wave functions

almost everywhere convergence

Paley-Wiener type spaces

Hankel transform

spherical Bessel functions 2010 MSC: 42B10

42C10

44A15

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Almost Everywhere Convergence of Prolate Spheroidal Series

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