Results 171 to 180 of about 354,525 (216)
Real topological cyclic homology of monoid-rings in characteristic 2 [PDF]
Tintinago Pinzón, David
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UPPER BOUND FOR MONOIDAL TOPOLOGICAL COMPLEXITY
UPPER BOUND FOR MONOIDAL TOPOLOGICAL COMPLEXITYopenaire
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Monoid and Topological Groupoid
Journal of the Indian Mathematical Society, 2018<p>Here we introduce some new results which are relative to the concept of topological monoid-groupoid and prove that the category of topological monoid coverings of X is equivalent to the category covering groupoids of the monoid-groupoid <span lang="EN-US">&#960;</span><span lang="EN-US"><sub></span>
Mohammad Qasim Mann’a
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A Topological Groupoid Representing the Topos of Presheaves on a Monoid [PDF]
Applied Categorical Structures, 2020 Butz and Moerdijk famously showed that every (Grothendieck) topos with enough points is equivalent to the category of sheaves on some topological groupoid.
Jens Hemelaer
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D'Alembert's functional equation on topological monoids
Publicationes Mathematicae Debrecen, 2009 The author proves that, if \(f\) is a continuous complex-valued function on the topological monoid \(M\) with neutral element \(e\) satisfying the functional equation \[ f(xyz)+f(xzy)=2f(x)f(yz)+2f(y)f(zx)+2f(z)f(xy)-4f(x)f(y)f(z) \] and \(f(e)=1\), then there is a continuous homomorphism \(h:M\rightarrow \text{Mat}_{2}\left(\mathbb{C}\right)\), the ...
Thomas M. K. Davison
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On some topological structures of topological monoids
Gulf Journal of MathematicsLet G be a topological monoid, meaning that it is both a monoid and a topological space with continuous multiplication. This paper focuses on points in G that do not possess compact neighborhoods.
Mohmmad Zailai +2 more
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A counterexample to the reconstruction of ω-categorical structures from their endomorphism monoid [PDF]
, 2018 We present an example of two countable $\omega$-categorical structures, one of which has a finite relational language, whose endomorphism monoids are isomorphic as abstract monoids, but not as topological monoids -- in other words, no isomorphism between
M. Bodirsky +3 more
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Illinois Journal of Mathematics, 2023
For a left action $S\overset{\lambda}{\curvearrowright}X$ of a cancellative right amenable monoid $S$ on a discrete Abelian group $X$, we construct its Ore localization $G\overset{\lambda^*}{\curvearrowright}X^*$, where $G$ is the group of left fractions
D. Dikranjan, A. Bruno, Simone Virili
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For a left action $S\overset{\lambda}{\curvearrowright}X$ of a cancellative right amenable monoid $S$ on a discrete Abelian group $X$, we construct its Ore localization $G\overset{\lambda^*}{\curvearrowright}X^*$, where $G$ is the group of left fractions
D. Dikranjan, A. Bruno, Simone Virili
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Uzbek Mathematical Journal
In the paper we investigate topological transformation groups on Tychonoff (in particular, compact Hausdorff) spaces. Using decompositions of given elements of the set of all idempotent probability measures on a given topological group, the group ...
A. Zaitov +2 more
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In the paper we investigate topological transformation groups on Tychonoff (in particular, compact Hausdorff) spaces. Using decompositions of given elements of the set of all idempotent probability measures on a given topological group, the group ...
A. Zaitov +2 more
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