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On the characterization of Gelfand-Shilov-Roumieu spaces

Published 4 Jun 2013 in math.FA | (1306.0800v1)

Abstract: Generalized $\mathbf{m}$-Gelfand-Shilov-Roumieu vector spaces $\mathcal{S}{\mathbf{m}}(\mathbf{X})$ are introduced. Here $\mathbf{m} = (m{(1)},...,m{(n)})$, $\mathbf{X}=(X{1},...,X_{n})$ and $m{(1)},...,m{(n)}$ are sequences of positive real numbers and $X_{1},...,X_{n}$ are operators in a Hilbert space. Conditions are given on the sequences $m{(1)},...,m{(n)}$ and on the operators $X_{1},...,X_{n}$ so that the equality $S_{\mathbf{m}}(\mathbf{X}) = S_{m{(1)}}(X_{1})\cap... \cap{S}{m{(n)}}(X{n})$ is valid. As a corollary we obtain a new proof of a characterization theorem for classical Gelfand-Shilov spaces.

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