Grothendieck groups in extriangulated categories

Abstract

The aim of the paper is to discuss the relation subgroups of the Grothendieck groups of extriangulated categories and certain other subgroups. It is shown that a locally finite extriangulated category has Auslander-Reiten -triangles and the relations of the Grothendieck group K0() are generated by the Auslander-Rieten -triangles. A partial converse result is given when restricting to the triangulated categories with a cluster tilting subcategory: in the triangulated category with a cluster tilting subcategory, the relations of the Grothendieck group K0() are generated by Auslander-Reiten triangles if and only if the triangulated category is locally finite. It is also shown that there is a one-to-one correspondence between subgroups of K0() containing the image of G and dense G-(co)resolving subcategories of where G is a generator of , which generalizes results about classifying subcategories of a triangulated t or an exact category m by subgroups of K0().