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On the Theory of Vector Valued Fourier Hyperfunctions
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Edge of the Wedge Theorem for Fourier Hyperfunctions
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Schwartz kernel theorem for the Fourier hyperfunctions
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Analytic fourier hyperfunctions
Applicable Analysis, 1999It is proved first a generalized Painleve's theorem to be used to prove necessary and sufficient conditions that a Fourier hyperfunction is defined by a real analytic function. These results are applied to the Taylor asymptotic expansion for Fourier hyperfunctions.
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Fourier analysis, distributions and hyperfunctions
Integral Transforms and Special Functions, 1998The theory of hyperfunctions and Fourier hyperfunctions is a really natural extension of the Schwartz theory of distributions and tempered distributions. We show that the naturalness of hyperfunctions comparing our results in hyperfunctions and the corresponding results in distributions in such areas as the characterization of test function spaces in ...
Jaeyoung Chung +2 more
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Wiener-Type Tauberian Theorems for Fourier Hyperfunctions
Zeitschrift für Analysis und ihre Anwendungen, 2002Two Wiener-type Tauberian theorems concerning Fourier hyperfunctions are proved and commented. It is shownt that the shift asymptotics ( S -asymptotics) of a hyperfunction f is determined by the ordinary asymptotics of
Pilipović, Stevan, Stanković, Bogoljub
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Periodic Hyperfunctions and Fourier Series Fourier Series
1992We have now almost finished the general discussion of hyperfunctions. From now on we shall attempt to apply this general theory to various cases. In this chapter we study periodic hyperfunctions. Then we shall see that the theory of Fourier series is naturally absorbed into the theory of Fourier transformations.
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The structure of a convergent family of fourier hyperfunctions
Integral Transforms and Special Functions, 1998We give the structural properties of a family of Fourier hyper-functions which converges as . The main result is also given in [5] but here we give an extended version with all the details of the proofs.
S. Pilipovlć, B. Stanković
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Convolution and multiplication operators in Fourier hyperfunctions
Integral Transforms and Special Functions, 2006We characterize the multiplication and convolution operators in the space ℱ′ of Fourier hyperfunctions. This generalizes the results of Schwartz on the multiplication and convolution operators on the space 𝒮′ of tempered distributions to the space ℱ′ of Fourier hyperfunctions.
Dohan Kim, Kwang Whoi Kim, Eun Gu Lee
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Asymptotic Taylor expansion for Fourier hyperfunctions
Proceedings of the Royal Society of London. Series A: Mathematical, Physical and Engineering Sciences, 1997Summary: A necessary and sufficient condition is proved that the asymptotic Taylor expansion for a Fourier hyperfunction converges in the space of Fourier hyperfunctions.
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