Homology of posets with functor coefficients supplies a new framework for studying Khovanov homology and related knot invariants.
Regular coverings and fundamental groupoids of Alexandroff spaces
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abstract
We summarize several results about the regular coverings and the fundamental groupoids of Alexandroff spaces. In particular, we show that the fundamental groupoid of an Alexandroff space $X$ is naturally isomorphic to the localization, at its set of morphisms, of the thin category associated to the set $X$ considered as a preordered set with the specialization preorder. We also show that the regular coverings of an Alexandroff space $X$ are represented by certain morphism-inverting functors with domain $X$, extending a result of E. Minian and J. Barmak about the regular coverings of locally finite T$_0$ spaces.
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2019 1verdicts
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Homology of posets with functor coefficients and its relation to Khovanov homology of knots
Homology of posets with functor coefficients supplies a new framework for studying Khovanov homology and related knot invariants.