Hochschild (co)homology in commutative algebra. A survey.
Ionescu, Cristodor (2001)
Analele Ştiinţifice ale Universităţii “Ovidius" Constanţa. Seria: Matematică
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Displaying similar documents to “Adams and Steenrod operators in dihedral homology.”
Hochschild (co)homology in commutative algebra. A survey.
Some recent results on Hochschild homology of commutative algebras.
Ana Lago, Antonio García Rodicio (1995)
Publicacions Matemàtiques
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This article is a brief survey of the recent results obtained by several authors on Hochschild homology of commutative algebras arising from the second author’s paper [21].
The relative dihedral homology of involutive algebras.
Gouda, Y.Gh. (1999)
International Journal of Mathematics and Mathematical Sciences
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Cyclic homology, a survey
Jean-Louis Loday (1986)
Banach Center Publications
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A remark on Koszul complexes.
Bruns, Winfried, Vetter, Udo (1998)
Beiträge zur Algebra und Geometrie
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The cyclic homology of
Cenkl, Bohumil, Vigué-Poirrier, Micheline
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A Note on the Hochschild Homology and Cyclic Homology of a topological Algebra.
Reinhold Hübl (1992)
Manuscripta mathematica
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A characterization of the Čech homology theory
S. K. Kaul (1970)
Colloquium Mathematicae
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Homology with equationally compact coefficients
Steven Garavaglia (1978)
Fundamenta Mathematicae
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A 2-category of chronological cobordisms and odd Khovanov homology
Krzysztof K. Putyra (2014)
Banach Center Publications
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We create a framework for odd Khovanov homology in the spirit of Bar-Natan's construction for the ordinary Khovanov homology. Namely, we express the cube of resolutions of a link diagram as a diagram in a certain 2-category of chronological cobordisms and show that it is 2-commutative: the composition of 2-morphisms along any 3-dimensional subcube is trivial. This allows us to create a chain complex whose homotopy type modulo certain relations is a link invariant. Both the original and...
Relationship among various Vietoris-type and microsimplicial homology theories
Takuma Imamura (2021)
Archivum Mathematicum
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In this paper, we clarify the relationship among the Vietoris-type homology theories and the microsimplicial homology theories, where the latter are nonstandard homology theories defined by M.C. McCord (for topological spaces), T. Korppi (for completely regular topological spaces) and the author (for uniform spaces). We show that McCord’s and our homology are isomorphic for all compact uniform spaces and that Korppi’s and our homology are isomorphic for all fine uniform spaces. Our homology...