English

Hasse Principle for Simply Connected Groups over Function Fields of Surfaces

Algebraic Geometry 2014-10-09 v4 Number Theory

Abstract

Let KK be the function field of a pp-adic curve, GG a semisimple simply connected group over KK and XX a GG-torsor over KK. A conjecture of Colliot-Th\'el\`ene, Parimala and Suresh predicts that if for every discrete valuation vv of KK, XX has a point over the completion KvK_v, then XX has a KK-rational point. The main result of this paper is the proof of this conjecture for groups of some classical types. In particular, we prove the conjecture when GG is of one of the following types: (1) 2An{}^2A_n^*, i.e. G=SU(h)G=\mathbf{SU}(h) is the special unitary group of some hermitian form hh over a pair (D,τ)(D, \tau), where DD is a central division algebra of square-free index over a quadratic extension LL of KK and τ\tau is an involution of the second kind on DD such that Lτ=KL^{\tau}=K; (2) BnB_n, i.e., G=Spin(q)G=\mathbf{Spin}(q) is the spinor group of quadratic form of odd dimension over KK; (3) DnD_n^*, i.e., G=Spin(h)G=\mathbf{Spin}(h) is the spinor group of a hermitian form hh over a quaternion KK-algebra DD with an orthogonal involution. Our method actually yields a parallel local-global result over the fraction field of a 2-dimensional, henselian, excellent local domain with finite residue field, under suitable assumption on the residue characteristic.

Keywords

Cite

@article{arxiv.1203.1075,
  title  = {Hasse Principle for Simply Connected Groups over Function Fields of Surfaces},
  author = {Yong Hu},
  journal= {arXiv preprint arXiv:1203.1075},
  year   = {2014}
}

Comments

39 pages, final version. Accepted for publication in Journal of the Ramanujan Mathematical Society

R2 v1 2026-06-21T20:29:26.433Z