Results 171 to 180 of about 469 (187)
A mathematical characterization of minimally sufficient robot brains. [PDF]
Int J Rob ResSakcak B +3 more
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UPPER BOUND FOR MONOIDAL TOPOLOGICAL COMPLEXITY
UPPER BOUND FOR MONOIDAL TOPOLOGICAL COMPLEXITYopenaire
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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Retractions and retracts of free topological monoids
International Journal of Computer Mathematics, 2006Some topological properties of retracts, semiretracts and retractions which make a link between the topological notion of a retract with its pure algebraic analogon in free monoids are presented.
Wit Foryś
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Topological finiteness properties of monoids, I: Foundations
Algebraic & Geometric Topology, 2022zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Gray, Robert D., Steinberg, Benjamin
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Fibrations and topological monoids
2001A continuous map p: X → Y has the lifting property with respect to a pair of topological spaces (Z, A) if for every commutative diagram of the form there exists a continuous map \(\Bbbk \) : Z → X such that pk = g and ki = f.
Yves Félix +2 more
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Classifying Spaces of Topological Monoids and Categories
American Journal of Mathematics, 1984This article explores homology and weak homotopy equivalences between classifying spaces of topological categories and discrete categories. Many recent results have dealt with this phenomenon: e.g. for any space X there is a discrete group and a homology equivalence BG\(\to X\) [\textit{D. Kan} and \textit{W.
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Semigroup identities in the monoid of two-by-two tropical matrices
Semigroup Forum, 2010Zur Izhakian, Stuart W Margolis
exaly