On inductive limits of topological algebras
Jerzy Kąkol (1982)
Colloquium Mathematicae
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Displaying similar documents to “On topological algebra sheaves of a nuclear type”
On inductive limits of topological algebras
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Anastasios Mallios (1972)
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Central morphisms and envelopes of holomorphy.
Kyriazis, Athanasios (1995)
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Topological localization in Fréchet algebras.
Batildo Requejo (1994)
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Boundaries in inductive limit topological algebras.
Hadjigeorgiou, R.I. (1997)
Portugaliae Mathematica
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Stany De Smedt (1994)
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Alexandroff One Point Compactification
Czesław Byliński (2007)
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In the article, I introduce the notions of the compactification of topological spaces and the Alexandroff one point compactification. Some properties of the locally compact spaces and one point compactification are proved.
On some classes of linear topological spaces II
Z. Kadelburg (1979)
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Kyriazis, Athanasios (1994)
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A -algebra without generalized topological divisors of zero
Hugo Peimbert, Wiesław Żelazko (1985)
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On Gelfand-Mazur theorem on a class of F -algebras
E. Anjidani (2014)
Topological Algebra and its Applications
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A topological algebra A is said to be fundamental if there exists b > 1 such that for every sequence (xn) in A, (xn) is Cauchy whenever the sequence bn(xn − xn-1) tends to zero as n → ∞. Let A be a complex unital fundamental F-algebra with bounded elements such that A* separates the points on A. Then we prove that the spectrum σ(a) of every element a ∈ A is nonempty compact. Moreover, if A is a division algebra, then A is isomorphic to the complex numbers ℂ. This result is a generalization...