Some remarks on equivalences between categories of modules

On *-modules generating the injectives, Almost *-modules need not be finitely generated, A Generalized Version of the Tilting Theorem, Equivalenze rappresentabili tra categorie di moduli, Quasi-tilting modules and counter equivalences, Dimension estimates for representable equivalences of module categories, Algebras with few ∗-modules, \(n\)-star modules over ring extensions., Classes of generalized ∗-modules, co-\(*^s\)-modules., Equivalences between projective and injective modules and morita duality for artinian rings, Tilting and torsion theory counter equivalences, Adjoint functors and equivalences of subcategories, Commutative rings in which every finitely generated ideal is quasi-projective, On a preprojective ∗-module, Tilting modules of finite projective dimension and a generalization of \(*\)-modules., Representable equivalences are represented by tilting modules, *- Modules over ring extensions, *-MODULES, TILTING, AND ALMOST ABELIAN CATEGORIES, ON THE COMPLEMENTARITY OF TWO QUASI-TILTING TRIPLES, Equivalences and the tilting theory., \(n\)-star modules and \(n\)-tilting modules., On a generalization of the auslander-bridger transpose, Costar modules, Idempotent monads and \(\star \)-functors, Estimates of global dimension, Finitely cotilting modules, Tilting modules and ∗-modules, Equivalences induced by n-self-cotilting comodules, \(\tau\)-tilting theory and \(*\)-modules., On *-modules over valuation rings, (n,t)-Quasi-Projective and Equivalences, A Taxonomy of Static Modules with Examples, ∞-costar modules, Quasi-cotilting modules and torsion-free classes, Tilting Modules and the Subcategories (C^M_i), Global dimension of the endomorphism ring and \(*^n\)-modules., \(*^s\)-modules., Morita equivalence for infinite matrix rings

• A theorem on equivalences between categories of modules with some applications
• Density and equivalence
• Fuller's theorem on equivalences
• On equivalences between module subcategories
• Localizations in categories of modules. I