Locally coherent exact categories (Q6600686)

Let \(\kappa\) be a regular cardinal, and \(A\) an exact \(\kappa\)-accesible additive category. The category \(A\) is called locally \(\kappa\)-coherent if the admissible short exact sequences in A coincide with the \(\kappa\)-directed colimits of admissible short exact sequences of \(\kappa\)-presentable objects. The author proves in Theorem 2.7 that if \(A\) is a \(\kappa\)-accesible category there are useful bijections between exact structures associated to the category \(A_{<\kappa}\) and locally \(\kappa\)-coherent exact structures on the additive category A.\N\NThe main aim of the paper is prove two periodicity theorems (Theorem 7.1 and Theorem 7.6) that generalize periodicity theorem proved in [\textit{D. J. Benson} and \textit{K. R. Goodearl}, Pac. J. Math. 196, No. 1, 45--67 (2000; Zbl 1073.20500); \textit{A. Neeman}, Invent. Math. 174, No. 2, 255--308 (2008; Zbl 1184.18008); \textit{J. Šaroch} and \textit{J. Št'ovíček}, Sel. Math., New Ser. 26, No. 2, Paper No. 23, 40 p. (2020; Zbl 1444.16010)]. The paper also contains many interesting examples that help the reader to understand the mathematical phenomena.