Results 231 to 240 of about 30,850 (254)
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Algebra of multipliers on the space of real analytic functions of one variable
Studia Mathematica, 2012We consider the topological algebra of (Taylor) multipliers on spaces of real analytic functions of one variable, i.e., maps for which monomials are eigenvectors. We describe multiplicative functionals and algebra homomorphisms on that algebra as well as idempotents in it. We show that it is never a Q-algebra and never locally m-convex.
Paweł Domanski, Michael Langenbruch
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Analytical evaluation of Fukui functions and real-space linear response function
The Journal of Chemical Physics, 2012Many useful concepts developed within density functional theory provide much insight for the understanding and prediction of chemical reactivity, one of the main aims in the field of conceptual density functional theory. While approximate evaluations of such concepts exist, the analytical and efficient evaluation is, however, challenging, because such ...
Yang, W. +3 more
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Composition operators on spaces of real analytic functions
Mathematische Nachrichten, 2003AbstractLet Ω1, Ω2be open subsets of ℝand ℝ, 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 operatorCφ: A(Ω1) → A(Ω2),Cφ(f) ≔f∘φ, is a topological embedding.
Domański, Paweł, Langenbruch, Michael
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Semi-Fredholm Toeplitz operators on the space of real analytic functions
Studia Mathematica, 2020exaly +2 more sources
Fr�chet-Valued Real Analytic Functions on Fr�chet Spaces
Monatshefte f�r Mathematik, 2003Let \(E\) be a real Fréchet space, \(D\subset E\) open, \(F\) a complex Fréchet space and \(f:D\to F\) a function. Then \(f\) is called topologically real analytic if locally \(f\) admits a power series expansion, while it is called real analytic if for each \(u\in F'\) the function \(u\circ D\to \mathbb{C}\) is topologically real analytic. Let \(A_t(D,
Le Mau Hai, Nguyen Van Khue
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A non-trivial Fr�chet quotient of the space of real analytic functions
Archiv der Mathematik, 2003In their earlier article [\textit{P. Domański} and \textit{D. Vogt}, Stud. Math. 142, 187--200 (2000; Zbl 0990.46015)], the authors proved the spectacular result that the space \({\mathcal A}(\Omega)\) of all complex-valued real-analytic functions on an open set \(\Omega \subset \mathbb{R}^d\), endowed with its natural locally convex topology, does not
Domański, Paweł, Vogt, Dietmar
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A note on composition operators on spaces of real analytic functions
Annales Polonici Mathematici, 2012We characterize composition operators on spaces of real analytic functions which are open onto their images. We give an example of a semi-proper map φ such that the associated composition operator is not open onto its image.
Paweł Domański +2 more
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Real Analytic Functions on Product Spaces and Separate Analyticity
Canadian Journal of Mathematics, 1961Let f be a function on the product space V × W, where V and W are analytic manifolds, both either real or complex. The function f is said to be analytic (or bi-analytic) on V × W if it is analytic in the analytic structure induced on V × W by the corresponding structures on V and W. The function f is said to be separately analytic on V × W if, for each
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The coherence of complemented ideals in the space of real analytic functions
Mathematische Annalen, 2009If \( V \) is a complex analytic subvariety of a complex neighborhood of \( \mathbb R^d \), then its ideal \( J_V(\mathbb R^d) \) is defined as the set of all real analytic functions on \( \mathbb R^d \) such that any extension to a holomorphic function on a neighborhood of \( \mathbb R^d \) vanishes in a neighborhood, relative to \( V \), of \( X = V \
Domański, Paweł, Vogt, Dietmar
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Convolution operators on spaces of real analytic functions
Mathematische Nachrichten, 2013AbstractLet\documentclass{article}\usepackage{amssymb}\begin{document}\pagestyle{empty}$I\subset \mathbb {R}$\end{document}be an open interval and let\documentclass{article}\usepackage{amssymb}\begin{document}\pagestyle{empty}$\mu \in A(\mathbb {R})^{\prime }$\end{document}and\documentclass{article}\usepackage{amssymb}\begin{document}\pagestyle{empty ...
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