English

Inverse Problems for deformation rings

Number Theory 2013-09-03 v3

Abstract

Let W\mathcal{W} be a complete local commutative Noetherian ring with residue field kk of positive characteristic pp. We study the inverse problem for the versal deformation rings RW(Γ,V)R_{\mathcal{W}}(\Gamma,V) relative to W\mathcal{W} of finite dimensional representations VV of a profinite group Γ\Gamma over kk. We show that for all pp and n1n \ge 1, the ring W[[t]]/(pnt,t2)\mathcal{W}[[t]]/(p^n t,t^2) arises as a universal deformation ring. This ring is not a complete intersection if pnW{0}p^n\mathcal{W}\neq\{0\}, so we obtain an answer to a question of M. Flach in all characteristics. We also study the `inverse inverse problem' for the ring W[[t]]/(pnt,t2)\mathcal{W}[[t]]/(p^n t,t^2); this is to determine all pairs (Γ,V)(\Gamma, V) such that RW(Γ,V)R_{\mathcal{W}}(\Gamma,V) is isomorphic to this ring.

Keywords

Cite

@article{arxiv.1012.1290,
  title  = {Inverse Problems for deformation rings},
  author = {Frauke M. Bleher and Ted Chinburg and Bart de Smit},
  journal= {arXiv preprint arXiv:1012.1290},
  year   = {2013}
}

Comments

17 pages; this paper is closely related to arXiv:1003.3143. In the third version, we added a new Section 5 with further examples

R2 v1 2026-06-21T16:54:20.535Z