English

Zero-cycles on quasi-projective surfaces over $p$-adic fields

Algebraic Geometry 2026-05-27 v2

Abstract

A conjecture of Colliot-Th\'{e}l\`{e}ne predicts that for a smooth projective variety XX over a finite extension kk of Qp\mathbb{Q}_p the kernel of the Albanese map CH0(X)deg=0AlbX(k)\text{CH}_0(X)^{\text{deg}=0}\to Alb_X(k) is the direct sum of a divisible group and a finite group. In this article we show that if π:XY\pi:X\dashrightarrow Y is a generically finite rational map between smooth projective surfaces and the conjecture is true for XkLX\otimes_k L for every finite extension L/kL/k, then it is true for YY. Using work of Raskind and Spiess, this proves the conjecture for surfaces that are geometrically dominated by products of curves, under some assumptions on the reduction type of the Jacobians. The method involves studying similar questions for an open subvariety UU of a projective surface XX by replacing the Chow group of 00-cycles with Suslin's singular homology H0sus(U)H_0^{\text{sus}}(U).

Keywords

Cite

@article{arxiv.2507.20076,
  title  = {Zero-cycles on quasi-projective surfaces over $p$-adic fields},
  author = {Evangelia Gazaki and Jitendra Rathore},
  journal= {arXiv preprint arXiv:2507.20076},
  year   = {2026}
}

Comments

35 pages

R2 v1 2026-07-01T04:20:30.574Z