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Convergence and integrability for some classes of trigonometric series

In this work, the theory of L¹-convergence for some classes of trigonometric series is elaborated. The work contains four chapters in which some new results are obtained. Also, new proofs of some well known theorems are given. A classical result concerning the integrability and L¹-convergence of a cosine series a / 2 + n = 1 a c o s n x (C) with convex coefficients is the well known theorem of Young. Later, Kolmogorov extended Young’s result for series (C) with quasi-convex coefficients and also showed that such cosine...

On Hankel Transform of Generalized Mathieu Series

Tomovski, Živorad — 2009

Fractional Calculus and Applied Analysis

Mathematics Subject Classification: Primary 33E20, 44A10; Secondary 33C10, 33C20, 44A20 By using integral representations for several Mathieu type series, a number of integral transforms of Hankel type are derived here for general families of Mathieu type series. These results generalize the corresponding ones on the Fourier transforms of Mathieu type series, obtained recently by Elezovic et al. [4], Tomovski [19] and Tomovski and Vu Kim Tuan [20].

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