The Fine interior of dilations of a rational polytope

TL;DR

This paper provides a combinatorial method to analyze the Fine interior of dilated rational polytopes, aiding in classifying lattice 3-polytopes with empty Fine interior and determining minimal dilations with non-empty interior.

Contribution

It introduces a purely combinatorial approach to describe Fine interiors of all dilations of rational polytopes, enabling computation of minimal dilations and classification of specific lattice polytopes.

Findings

Computed the smallest dilation with non-empty Fine interior.

Classified all lattice 3-polytopes with a single-point Fine interior.

Provided a combinatorial framework for analyzing dilated polytopes.

Abstract

A nondegenerate toric hypersurface of negative Kodaira dimension can be characterized by the empty Fine interior of its Newton polytope according to recent work by Victor Batyrev, where the Fine interior is the rational subpolytope consisting of all points which have an integral distance of at least 1 to all integral supporting hyperplanes of the Newton polytope. Moreover, we get more information in this situation if we can describe how the Fine interior behaves for dilations of the Newton polytope, e.g. if we can determine the smallest dilation with a non-empty Fine interior. Therefore, in this article we give a purely combinatorial description of the Fine interiors of all dilations of a rational polytope, which allows us in particular to compute this smallest dilation and to classify all lattice 3-polytopes with empty Fine interior, for which we have only one point as Fine interior of the smallest dilation with non-empty Fine interior.