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Basic properties of left homotopy: The homotopy relation in a model category
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Derived functors: Identity and Homotopy Categories
Explores derived functors in model categories, focusing on identity and homotopy categories.
Homotopy Category and Derived Functors
Explores the homotopy category of chain complexes and the relation between quasi-isomorphisms and chain homotopy equivalences.
Quillen Equivalences
Explores Quillen equivalences, emphasizing the preservation of cofibrations and acyclic cofibrations.
Derived Functors in Homotopical Algebra
Covers the Fundamental Theorem of homotopical algebra, Quillen pairs, and derived functors.
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Explores the Serre model structure on Top, focusing on right and left homotopy.
Lifting Properties in Model Categories: An Overview
Provides an overview of lifting properties in model categories, focusing on their definitions and implications for morphisms and commutative diagrams.
Introduction to Derived Functors: Left and Right Derived Functors
Introduces left and right derived functors in homotopical algebra, emphasizing their uniqueness and providing an illustrative example.
Model Categories and Homotopy Theory: Functorial Connections
Covers the relationship between model categories and homotopy categories through functors preserving structural properties.
The Topological Künneth Theorem
Explores the topological Künneth Theorem, emphasizing commutativity and homotopy equivalence in chain complexes.
Fundamental Groups
Explores fundamental groups, homotopy classes, and coverings in connected manifolds.
