中文

Dimension filtrations in birational localisation

代数几何 2026-06-27 v1

摘要

Let SbS_b be the class of birational morphisms between smooth varieties over a field FF, and let Ln=Sb1dn\Sm(F)L_n=S_b^{-1}d_{\leq n}\Sm(F). Kahn and Sujatha asked whether the natural functor LnSb1\Sm(F)L_n\to S_b^{-1}\Sm(F) is fully faithful. We prove that it is fully faithful exactly for n=0n=0. More strongly, for every n1n\geq1 and every Nn+1N\geq n+1, the transition functor LnLNL_n\to L_N has an infinite fibre on an endomorphism set. The proof identifies a sharp dimension threshold: if dimX+rn\dim X+r\leq n, then X×ArXX\times\mathbb A^r\to X is invertible in LnL_n precisely when dimX+rn1\dim X+r\leq n-1. We also give proper and projective analogues.

引用

@article{arxiv.2606.29044,
  title  = {Dimension filtrations in birational localisation},
  author = {David Kumallagov},
  journal= {arXiv preprint arXiv:2606.29044},
  year   = {2026}
}

备注

6 pages