English

On a generalized Auslander-Reiten conjecture

Commutative Algebra 2023-06-08 v4

Abstract

It is well-known that the generalized Auslander-Reiten condition (GARC) and the symmetric Auslander condition (SAC) are equivalent, and (GARC) implies that the Auslander-Reiten condition (ARC). In this paper we explore (SAC) along with the several canonical change of rings RSR \to S. First, we prove the equivalence of (SAC) for RR and R/xRR/xR, where xx is a non-zerodivisor on RR, and the equivalence of (SAC) and (SACC) for rings with positive depth, where (SACC) is the symmetric Auslander condition for modules with constant rank. The latter assertion affirmatively answers a question posed by Celikbas and Takahashi. Secondly, for a ring homomorphism RSR \to S, we prove that if SS satisfies (SAC) (resp. (ARC)), then RR also satisfies (SAC) (resp. (ARC)) if the flat dimension of SS over RR is finite. We also prove that (SAC) for RR implies that (SAC) for SS when RR is Gorenstein and S=R/QS=R/Q^\ell, where QQ is generated by a regular sequence of RR and the length of the sequence is at least \ell. This is a consequence of more general results about Ulrich ideals proved in this paper. Applying these results to determinantal rings and numerical semigroup rings, we provide new classes of rings satisfying (SAC). A relation between (SAC) and an invariant related to the finitistic extension degree is also explored.

Keywords

Cite

@article{arxiv.2209.12718,
  title  = {On a generalized Auslander-Reiten conjecture},
  author = {Souvik Dey and Shinya Kumashiro and Parangama Sarkar},
  journal= {arXiv preprint arXiv:2209.12718},
  year   = {2023}
}

Comments

Substantial reorganization. Some mistakes corrected. Comments are welcome!

R2 v1 2026-06-28T02:06:45.198Z