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Topological properties of semigroup primes of a commutative ring
, 2017A semigroup prime of a commutative ring R is a prime ideal of the semigroup $$(R,\cdot )$$(R,·). One of the purposes of this paper is to study, from a topological point of view, the space $${\varvec{\mathcal {S}}}(R)$$S(R) of prime semigroups of R.
C. Finocchiaro, M. Fontana, D. Spirito
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Variational principle for neutralized Bowen topological entropy on subsets of free semigroup actions
Proceedings - Mathematical Sciences, 2023J. Sarkooh
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Ideal Extensions of Topological Semigroups
Canadian Journal of Mathematics, 1970In the study of compact semigroups the constructive method rather than the representational method is usually the better plan of attack. As it was pointed out by Hofmann and Mostert in the introduction to their book [10] this method is more productive than searching for a
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Variational Principle for Topological Pressure on Subsets of Free Semigroup Actions
Acta Mathematica Sinica. English series, 2021Xingxin Zhong, Z. J. Chen
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Topological Pressure of Free Semigroup Actions for Non-Compact Sets and Bowen’s Equation, I
Journal of Dynamics and Differential Equations, 2021Qianying Xiao, Dongkui Ma
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Semigroup Forum, 2012
The author considers certain locally compact Hausdorff semi-topological Brandt semigroups \(B(G,I)\) of \(|x|\) matrix units over \(G\cup\{0\}\), where \(G\) is a locally compact Hausdorff topological group and \(I\) is an index set and studies the relation between the semigroup algebras of \(B(G,I)\) and \(I^1\)-Munn algebras over group algebras ...
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The author considers certain locally compact Hausdorff semi-topological Brandt semigroups \(B(G,I)\) of \(|x|\) matrix units over \(G\cup\{0\}\), where \(G\) is a locally compact Hausdorff topological group and \(I\) is an index set and studies the relation between the semigroup algebras of \(B(G,I)\) and \(I^1\)-Munn algebras over group algebras ...
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On the topologization of commutative semigroups
Mathematical Notes of the Academy of Sciences of the USSR, 1975zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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Topological Groups and Semigroups
19881°. A topological group is a group endowed with a Hausdorff topology relative to which the operations of multiplication and inversion are continuous (the latter being therefore a homeomorphism); here the Cartesian product of the group with itself is endowed with the product topology.
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