Tensor-Hom formalism for modules over nonunital rings

Abstract

We say that a ring R is t-unital if the natural map RRR→ R is an isomorphism, and a left R-module P is c-unital if the natural map P→HomR(R,P) is an isomorphism. For a t-unital ring R, the category of t-unital left R-modules is a unital left module category over an associative, unital monoidal category of t-unital R-R-bimodules, while the category of c-unital left R-modules is opposite to a unital right module category over the same monoidal category. Any left s-unital ring R, as defined by Tominaga in 1975, is t-unital; and a left R-module is s-unital if and only if it is t-unital. For any (nonunital) ring R, the full subcategory of s-unital R-modules is a hereditary torsion class in the category of nonunital R-modules; and for rings R arising from small preadditive categories, the full subcategory of c-unital R-modules is closed under kernels and cokernels. However, over a t-unital ring R, the full subcategory of t-unital modules need not be closed under kernels, and the full subcategory of c-unital modules need not be closed under cokernels in the category of nonunital modules. Nevertheless, the categories of t-unital and c-unital left R-modules are abelian and naturally equivalent to each other; they are also equivalent to the quotient category of the abelian category of nonunital modules by the Serre subcategory of modules with zero action of R. This is a particular case of the result from a 1996 manuscript of Quillen. We also discuss related flatness, projectivity, and injectivity properties; and study the behavior of t-unitality and c-unitality under the restriction of scalars for a homomorphism of nonunital rings. Our motivation comes from the theory of semialgebras over coalgebras over fields.