Relative Koszul coresolutions and relative Betti numbers

Abstract

Let G be a finitely generated right A-module for a finite-dimensional algebra A over a filed , and I the additive closure of G. We will define a I-relative Koszul coresolution K(V) of an indecomposable direct summand V of G, and show that for a finitely generated A-module M, the I-relative i-th Betti number for M at V is given as the -dimension of the i-th homology of the I-relative Koszul complex KV(M):=HomA(K(V),M) of M at V for all i 0. This is applied to investigate the minimal interval resolution/coresolution of a persistence module M, e.g., to check the interval decomposability of M, and to compute the interval approximation of M.