Abstract
ABSTRACTIn this paper, we consider the Bessel–Struve transform and we establish an analogous of Beurling-Hörmander's theorem for each . More precisely, we determine the form of nonzero functions satisfying weaken condition of Beurling–Hörmander's theorem which differ from α half integer or non-half integer. As applications, we obtain a Cowling–Price-type theorem and analogous of Hardy's theorem.
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