A method for constructing minimal projective resolutions over idempotent subrings

Abstract

We show how to obtain minimal projective resolutions of finitely generated modules over an idempotent subring e := (1-e)R(1-e) of a semiperfect noetherian basic ring R by a construction inside mod R. This is then applied to investigate homological properties of idempotent subrings e under the assumption of R/ 1-e being a right artinian ring. In particular, we prove the conjecture by Ingalls and Paquette that a simple module Se := eR /rad eR with ExtR1(Se,Se) = 0 is self-orthogonal, that is ExtkR(Se,Se) vanishes for all k ≥ 1, whenever gl R and pdim eR(1-e)_e are finite. Indeed, a slightly more general result is established, which applies to sandwiched idempotent subrings: Suppose e ∈ R is an idempotent such that all idempotent subrings sandwiched between e and R, that is e ⊂ ⊂ R, have finite global dimension. Then the simple summands of Se can be numbered S1, …, Sn such that ExtRk(Si, Sj) = 0 for 1 ≤ j ≤ i ≤ n and all k > 0.