English

A note on cohomological vanishing theorems

Commutative Algebra 2024-01-26 v1

Abstract

We study cd(M,N):=sup{j:Hmj(M,N)0}cd(M,N):=\sup\{j:H^j_{m}(M,N)\neq0\}, and we prove the following over ABAB-rings: cd(M,N)<cd(M,N)<\infty iff cd(M,N)2dimRcd(M, N)\leq2 dim R. For locally free over the punctured spectrum, we present the better bound, namely cd(M,N)<cd(M, N)<\infty iff cd(M,N)dimR,cd(M, N)\leq dim R, and show this is sharp for maximal Cohen-Macaulay, and prove that this detects freeness of MM. We present some explicit examples to compute cd(M,N)cd(M, N). Now, suppose RR is only Cohen-Macaulay and of prime characteristic equipped with the Frobenius map φ\varphi. We show for some n0n\gg 0 that cd(φnR,M)<cd(^{\varphi_n}R,M)<\infty iff idR(M)<.id_R(M)<\infty. This presents some criteria on regularity. Also, some vanishing results on ExtRi(φR,)Ext^i_R(^{\varphi}R,-) are given, where (){R,φR}(-)\in\{R,^{\varphi}R\}. We determine conditions under which the vanishing ExtRi(φR,)Ext^i_R(^{\varphi}R,-) of restricted many ii-th, implies the vanishing of all.

Keywords

Cite

@article{arxiv.2401.14133,
  title  = {A note on cohomological vanishing theorems},
  author = {Mohsen Asgharzadeh},
  journal= {arXiv preprint arXiv:2401.14133},
  year   = {2024}
}
R2 v1 2026-06-28T14:27:01.470Z