Semiunital Semimonoidal Categories (Applications to Semirings and Semicorings)

Abstract

The category ASA of bisemimodules over a semialgebra A, with the so called Takahashi's tensor product -A-, is semimonoidal but not monoidal. Although not a unit in AS%A, the base semialgebra A has properties of a semiunit (in a sense which we clarify in this note). Motivated by this interesting example, we investigate semiunital semimonoidal categories (V%, , I) as a framework for studying notions like semimonoids (semicomonoids) as well as a notion of monads (comonads) which we call J-monads (J-% comonads) with respect to the endo-functor J:=I - - I:V V. This motivated also introducing a more generalized notion of monads (comonads) in arbitrary categories with respect to arbitrary endo-functors. Applications to the semiunital semimonoidal variety (AS%A,A,A) provide us with examples of semiunital A-semirings (semicounital A-semicorings) and semiunitary semimodules (semicounitary semicomodules) which extend the classical notions of unital rings (counital corings) and unitary modules (counitary comodules).