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Repellers for multifunctions of semi-bornological spaces
Acta Mathematica Scientia, 2008Abstract In this article the notion of repeller for multifunctions from the viewpoints of semi-bornological spaces is considered. The concept of lower semi-continuous multifunctions is extended by the use of semi-bornological spaces. Semi-bornological vector spaces are studied.
M.R. Molaei, T. Waezizadeh
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Counterexample on products of bornological spaces
Archiv der Mathematik, 2000A linear topological space \(X\) is called bornological and \({\mathcal L}\)-bornological if every bounded linear map on \(X\) with values in a locally convex space and a linear topological space, respectively, is continuous. It is known [\textit{G. W. Mackey}, Bull. Am. Math. Soc.
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Some classes of linear bornological spaces
Proceedings of the Royal Society of Edinburgh: Section A Mathematics, 1981SynopsisIn this paper, two classes of linear bornological spaces are considered, the Kolmogorov spaces and the spaces of type b. These spaces satisfy conditions which are weakenings of the definition of infratopological linear bornological spaces. Various properties of these spaces are proved, and two examples are given, showing the independence of the
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The Category of Quotient Bornological Spaces
1986Quotient spaces are useful. They will be part of Functional analysis as soon as Functional Analysts understand that they are useful. I have explained how I arrived in spaces with a boundedness, then in quotient spaces.
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On bornological topological space and digraphs
AIP Conference Proceedings, 2023Khalid Shea Khaiarallaha Al’Dzhabri +1 more
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The Barrelled Space Associated with a Bornological Space need not Be Bornological
Bulletin of the London Mathematical Society, 1980openaire +1 more source
Subspaces of Bornological and Quasibarrelled Spaces
Journal of the London Mathematical Society, 1973openaire +1 more source
Bornological methods in ordered topological vector spaces
Siberian Mathematical Journal, 1976Geiler, V. A. +2 more
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