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This article is cited in 1 scientific paper (total in 1 paper)
Asymptotic almost automorphy for algebras of generalized functions
Ch. Bouzar, M. Slimani Laboratory of Mathematical Analysis and Applications, University Oran 1, Ahmed Ben Bella, 31000 Oran, Algeria
Abstract:
The paper aims to to study the concept of asymptotic almost automorphy in the context of generalized functions. We introduce an algebra of asymptotically almost automorphic generalized functions which contains the space of smooth asymptotically almost automorphic functions as a subalgebra. The fundamental importance of this algebra, is related to the impossibility of multiplication of distributions; it also contains the asymptotically almost automorphic Sobolev–Schwartz distributions as a subspace. Moreover, it is shown that the introduced algebra is stable under some nonlinear operations. As a by pass result, the paper gives a Seeley type result on extension of functions in the context of the algebra of bounded generalized functions and the algebra of bounded generalized functions vanishing at infinity, these results are used to prove the fundamental result on the uniqueness of decomposition of an asymptotically almost automorphic generalized function. As applications, neutral difference-differential systems are considered in the framework of the algebra of generalized functions.
Key words:
asymptotic almost automorphy, generalized functions, neutral difference differential equations.
Received: 07.02.2022
Citation:
Ch. Bouzar, M. Slimani, “Asymptotic almost automorphy for algebras of generalized functions”, Vladikavkaz. Mat. Zh., 25:2 (2023), 38–55
Linking options:
https://www.mathnet.ru/eng/vmj858 https://www.mathnet.ru/eng/vmj/v25/i2/p38
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