Rank functions on (d+2)-angulated categories -- a functorial approach

Abstract

We introduce the notion of a rank function on a (d+2)-angulated category C which generalises the notion of a rank function on a triangulated category. Inspired by work of Chuang and Lazarev, for d an odd positive integer, we prove that there is a bijective correspondence between rank functions defined on objects in C and rank functions defined on morphisms in C. Inspired by work of Conde, Gorsky, Marks and Zvonareva, for d an odd positive integer, we show there is a bijective correspondence between rank functions on ProjA and additive functions on mod(ProjA), where ProjA is endowed with the Amiot-Lin (d+2)-angulated category structure. This allows us to show that every integral rank function on ProjA can be decomposed into irreducible rank functions.