On the category of semi-graded modules

Abstract

Lezama LezamaLatorre2017 introduced the notion of semi-graded ring with the aim of generalizing Z-graded rings and several families of noncommutative rings of polynomial type non-N-graded such as the skew Poincaré-Birkhoff-Witt extensions defined by him GallegoLezama2010. In a series of papers, Lezama2020, Lezama2021, LezamaGomez2019, LezamaLatorre2017, he studied problems of non-commutative projective algebraic geometry generalizing the original ideas of Artin et al. Artin1992, ArtinSchelter1987, ArtinTateVandenBergh2007, ArtinTateVandenBergh1991, ArtinZhang1994 on N-graded rings, in the categorical context of the category SGR-R of left semi-graded modules over a semi-graded ring R. In this note we prove that SGR-R possesses a canonical set of free generators via shifted twists, which endows the category with a Grothendieck structure and guarantees the existence of enough injective and projective objects. This categorical robustness allows us to formulate a semi-graded analogue of Baer's criterion for injectivity and to establish a first approach to the dual theory of projective resolutions using shifted twists.