English

Frobenius powers of non-complete intersections

Commutative Algebra 2007-05-23 v2

Abstract

For a commutative ring RR of characteristic pp, let ϕ:RR\phi : R \to R be the Frobenius homomorphism and let ϕrR^{\phi^r}R denote the RR-module structure on RR defined via the rr-th power of the Frobenius. We show that the Tor functor against the Frobenius module, \TorR(,ϕrR)\Tor^R_*(-, {^{\phi^r}}R), is rigid for a certain class of depth zero rings which includes rings that are not complete intersection. We also show that \TorR(,ϕrR)\Tor^R_*(-, {^{\phi^r}}R) is not rigid (non-vacuously) when \depth(R)>0\depth (R) >0 and rr is large enough. This answers a question of Avramov and Miller: does rigidity of \TorR(,ϕrR)\Tor^R_*(-, {^{\phi^r}}R) hold for non-complete intersections?

Keywords

Cite

@article{arxiv.math/0106226,
  title  = {Frobenius powers of non-complete intersections},
  author = {Miriam Ruth Kantorovitz},
  journal= {arXiv preprint arXiv:math/0106226},
  year   = {2007}
}

Comments

LaTeX2e, 7 pages, uses pb-diagram