Maps of cotriples and a change of rings theorem
Measure characteristics of complexes
Methods of calculating cohomological and Hochschild-Mitchell dimensions of finite partially ordered sets.
Minimal finite models.
Minimal resolutions and other minimal models.
In many situations, minimal models are used as representatives of homotopy types. In this paper we state this fact as an equivalence of categories. This equivalence follows from an axiomatic definition of minimal objects. We see that this definition includes examples such as minimal resolutions of Eilenberg-Nakayama-Tate, minimal fiber spaces of Kan and Λ-minimal Λ-extensions of Halperin. For the first one, this is done by generalizing the construction of minimal resolutions of modules to complexes....
Model structures for homotopy of internal categories.
Model-categories of coalgebras over operads.
Modules de -bordisme. Couples exacts cohérents
Modules de -bordisme. -résolutions de complexes finis
Modules with injective cohomology, and local duality for a finite group.
Monads and cohomology modules of rank 2 vector bundles
Monotone-light factorization for Kan fibrations of simplicial sets with respect to groupoids.
Moore categories.
More about homological properties of precrossed modules.
More about the (co)homology of groups and associative algebras.
More on injectivity in locally presentable categories.
Morita Equivalences of Functor Categories and Decompositions of Functors Defined on a Category Associated to Algebras with One-Side Units
Conditions which imply Morita equivalences of functor categories are described. As an application a Dold-Kan type theorem for functors defined on a category associated to associative algebras with one-side units is proved.
Motivically functorial coniveau spectral sequences; direct summands of cohomology of function fields.