English

A method for constructing minimal projective resolutions over idempotent subrings

Representation Theory 2023-09-04 v3

Abstract

We show how to obtain minimal projective resolutions of finitely generated modules over an idempotent subring Γe:=(1e)R(1e)\Gamma_e := (1-e)R(1-e) of a semiperfect noetherian basic ring RR by a construction inside modR\mathsf{mod} R. This is then applied to investigate homological properties of idempotent subrings Γe\Gamma_e under the assumption of R/1eR/\langle 1-e\rangle being a right artinian ring. In particular, we prove the conjecture by Ingalls and Paquette that a simple module Se:=eR/radeRS_e := eR /\operatorname{rad} eR with ExtR1(Se,Se)=0\operatorname{Ext}_R^1(S_e,S_e) = 0 is self-orthogonal, that is ExtRk(Se,Se)\operatorname{Ext}^k_R(S_e,S_e) vanishes for all k1k \geq 1, whenever glR\operatorname{gl} R and pdimeR(1e)Γe\operatorname{pdim} eR(1-e)_{\Gamma_e} are finite. Indeed, a slightly more general result is established, which applies to sandwiched idempotent subrings: Suppose eRe \in R is an idempotent such that all idempotent subrings Γ\Gamma sandwiched between Γe\Gamma_e and RR, that is ΓeΓR\Gamma_e \subset \Gamma \subset R, have finite global dimension. Then the simple summands of SeS_e can be numbered S1,,SnS_1, \dots, S_n such that ExtRk(Si,Sj)=0\operatorname{Ext}_R^k(S_i, S_j) = 0 for 1jin1 \leq j \leq i \leq n and all k>0k > 0.

Keywords

Cite

@article{arxiv.2111.03311,
  title  = {A method for constructing minimal projective resolutions over idempotent subrings},
  author = {Carlo Klapproth},
  journal= {arXiv preprint arXiv:2111.03311},
  year   = {2023}
}

Comments

Accepted for publication at Proceedings of the American Mathematical Society

R2 v1 2026-06-24T07:27:19.262Z