Abstract
PurposeUsing a generalized translation operator, this study aims to obtain a generalization of Titchmarsh's theorem for the Laguerre–Bessel transform for functions satisfying the ψ-Laguerre–Bessel–Lipschitz condition in the space L2α (K), where K=0,+∞×0,+∞[.Design/methodology/approachThe author has employed the results developed by Titchmarsh, of reference number [1].FindingsIn this paper, an analogous of Titchmarsh's theorem is established for Laguerre–Bessel transform.Originality/valueTo the best of the authors’ findings, at the time of submission of this paper, the results reported are new and interesting.
Reference14 articles.
1. Characterization of Dini-Lipschitz functions for the Helgason Fourier transform on rank one symmetric spaces;Adv Pure Appl Math,2016
2. An analog of Titchmarsh's theorem for the generalized Dunkl transform;J.Pseud Diff Op Appl,2016
3. Generalization of Titchmarsh's theorem for the Dunkl transform in the space Lp(Rd;wl(x)dx)
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