Tempered ultradistributions as boundary values of analytic functions
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- by R. S. Pathak PDF
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Abstract:
The spaces ${S_{{a_k}}}$, ${S^{{b_q}}}$ and $S_{{a_{k}}}^{{b_q}}$ were introduced by I. M. Gel’fand as a generalization of the test function spaces of type $S$; the elements of the corresponding dual spaces are called tempered ultradistributions. It is shown that a function which is analytic in a tubular radial domain and satisfies a certain nonpolynomial growth condition has a distributional boundary value in the weak topology of the tempered ultradistribution space $(S_{{b_{k}}}^{{a_{q}}})\prime$, which is the space of Fourier transforms of elements in $(S_{{a_{k}}}^{{b_{q}}})\prime$. This gives rise to a representation of the Fourier transform of an element $U \in (S_{{a_{k}}}^{{b_{q}}})\prime$ having support in a certain convex set as a weak limit of the analytic function. Converse results are also obtained. These generalized Paley-Wiener-Schwartz theorems are established by means of a number of new lemmas concerning $S_{{a_{k}}}^{{b_{q}}}$ and its dual. Finally, in the appendix the equality $S_{{a_k}}^{{b_q}} = {S_{{a_k}}} \cap {S^{{b_q}}}$ is proved.References
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Additional Information
- © Copyright 1984 American Mathematical Society
- Journal: Trans. Amer. Math. Soc. 286 (1984), 537-556
- MSC: Primary 46F20; Secondary 32A40
- DOI: https://doi.org/10.1090/S0002-9947-1984-0760974-1
- MathSciNet review: 760974