Abstract:
In the work we consider a topological module P(a;b)P(a;b) of entire functions, which is the isomorphic image of the Schwarz space of distributions with compact supports in a finite or infinite interval (a;b)⊂R under the Fourier–Laplace transform. We prove that each weakly localizable module in P(a;b) is either generated by its two elements or is equal to the closure of two submodules of special form. We also provide dual results on subspaces in C∞(a;b) invariant w.r.t. the differentiation operator.
Keywords:
entire functions, subharmonic functions, Fourier–Laplace transform, finitely generated submodules, description of submodules, local description of submodules, invariant subspaces, spectral synthesis.
Citation:
N. F. Abuzyarova, “On 2-generateness of weakly localizable submodules in the module of entire functions of exponential type and polynomial growth on the real axis”, Ufa Math. J., 8:3 (2016), 8–21
\Bibitem{Abu16}
\by N.~F.~Abuzyarova
\paper On $2$-generateness of weakly localizable submodules in the module of entire functions of exponential type and polynomial growth on the real axis
\jour Ufa Math. J.
\yr 2016
\vol 8
\issue 3
\pages 8--21
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Linking options:
https://www.mathnet.ru/eng/ufa322
https://doi.org/10.13108/2016-8-3-8
https://www.mathnet.ru/eng/ufa/v8/i3/p8
This publication is cited in the following 4 articles:
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