English

Projecting lattice polytopes according to the Minimal Model Program

Algebraic Geometry 2023-08-01 v1 Combinatorics

Abstract

The Fine interior F(P)F(P) of a dd-dimensional lattice polytope PRdP \subset {\Bbb R}^d is the set of all points yPy \in P having integral distance at least 11 to any integral supporting hyperplane of PP. We call a lattice polytope FF-hollow if its Fine interior is empty. The main theorem claims that up to unimodular equivalence in each dimension dd there exist only finitely many dd-dimensional FF-hollow lattice polytopes PP, so called {\em sporadic}, which do not admit a lattice projection onto a kk-dimensional FF-hollow lattice polytope PP' for some 1kd11 \leq k \leq d-1. The proof is purely combinatorial, but it is inspired by Q{\Bbb Q}-Fano fibrations in the Minimal Model Program, since we show that non-degenerate toric hypersurfaces Z(C)dZ \subset ({\Bbb C}^*)^d defined by zeros of Laurent polynomials with a given Newton polytope PP have negative Kodaira dimension if and only if PP is FF-hollow. The finiteness theorem for dd-dimensional sporadic FF-hollow Newton polytopes PP gives rise to finitely many families F(P){\mathcal F}(P) of (d1)(d-1)-dimensional Q{\Bbb Q}-Fano hypersurfaces with at worst canonical singularities.

Keywords

Cite

@article{arxiv.2307.16306,
  title  = {Projecting lattice polytopes according to the Minimal Model Program},
  author = {Victor V. Batyrev},
  journal= {arXiv preprint arXiv:2307.16306},
  year   = {2023}
}

Comments

17 pages

R2 v1 2026-06-28T11:43:55.062Z