Composition operators on spaces of real
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Paweł Domański; Michael Langenbruch
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Article
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2003
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John Wiley and Sons
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English
⚖ 259 KB
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Let Ω1, Ω2 be open subsets of R d 1 and R d 2 , respectively, and let A(Ω1) denote the space of real analytic functions on Ω1. We prove a Glaeser type theorem by characterizing when a composition operator Cϕ : Using this result we characterize when A(Ω1) can be embedded topologically into A(Ω2) as