English

Zero map between obstruction spaces: subvarieties versus cycles

Algebraic Geometry 2018-03-28 v2

Abstract

For YXY \subset X a locally complete intersection of codimension p, Spencer Bloch [2] constructed the semi-regularity map π:H1(NY/X)Hp+1(ΩX/kp1)\pi: H^{1}(\mathcal{N}_{Y/X}) \to H^{p+1}(\Omega_{X/k}^{p-1}). As an analogue, we construct a map π~:H1(NY/X)Hp+1(ΩX/Qp1)\tilde{\pi}: H^{1}(\mathcal{N}_{Y/X}) \to H^{p+1}(\Omega_{X/\mathbb{Q}}^{p-1}), without assuming local complete intersections. While the semi-regularity map π\pi is expected to be injective, we show π~\tilde{\pi} is a zero map. We use this zero map to interpret how to eliminate obstructions to deforming cycles, an idea by Mark Green and Phillip Griffiths in [9].

Keywords

Cite

@article{arxiv.1708.02722,
  title  = {Zero map between obstruction spaces: subvarieties versus cycles},
  author = {Sen Yang},
  journal= {arXiv preprint arXiv:1708.02722},
  year   = {2018}
}

Comments

Minor change, polish language

R2 v1 2026-06-22T21:10:09.929Z