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Lecture
Nerves and Geometric Realization
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Related lectures (32)
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Bar Construction: Homology Groups and Classifying Space
Covers the bar construction method, homology groups, classifying space, and the Hopf formula.
Homology Theorem
Covers the proof of Theorem A, discussing homology, quotients, and isomorphisms.
Active Learning: Functors and Geometric Realization
Covers the computation of nerves and geometric realization in simplicial sets, along with functors into and out of the category of simplicial sets.
Functor Categories: (Co)Limits and Simplicial Sets
Explores (co)limits in functor categories and simplicial sets, including equalizers and coequalizers of simplicial maps.
Understanding Lifting Properties in Homotopy Theory
Focuses on lifting properties in homotopy theory of chain complexes.
Group Cohomology
Covers the concept of group cohomology, focusing on chain complexes, cochain complexes, cup products, and group rings.
Model Categories and Homotopy Theory: Functorial Connections
Covers the relationship between model categories and homotopy categories through functors preserving structural properties.
From Simplicial Categories to Quasicategories
Introduces the construction of quasi-categories from Kan enriched categories through defining simplicially enriched categories and constructing the simplicial nerve functor.
A Lemma: Introduction to Homology Groups
Introduces the concept of homology groups and focuses on a lemma about free abelian groups.
Homotopy Theory in Chain Complexes
Explores acyclic fibrations and cylinder objects in chain complexes.
