국가지식-학술정보
CONSTRUCTIONS OF SEGAL ALGEBRAS IN L<sup>1</sup>(G) OF LCA GROUPS G IN WHICH A GENERALIZED POISSON SUMMATION FORMULA HOLDS
- 대한수학회
- Journal of the Korean Mathematical Society
- Vol.59 No.2
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2022.01367 - 377 (11 pages)
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DOI : 10.4134/JKMS.j210290
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Let G be a non-discrete locally compact abelian group, and 𝜇 be a transformable and translation bounded Radon measure on G. In this paper, we construct a Segal algebra S<sub>𝜇</sub>(G) in L<sup>1</sup>(G) such that the generalized Poisson summation formula for 𝜇 holds for all f ∈ S<sub>𝜇</sub>(G), for all x ∈ G. For the definitions of transformable and translation bounded Radon measures and the generalized Poisson summation formula, we refer to L. Argabright and J. Gil de Lamadrid's monograph in 1974.
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