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Bibliographic Details
Main Authors: De Loera, Jesús A., Marsters, Brittney, O'Neill, Christopher
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2509.04726
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author De Loera, Jesús A.
Marsters, Brittney
O'Neill, Christopher
author_facet De Loera, Jesús A.
Marsters, Brittney
O'Neill, Christopher
contents We introduce the arithmetic width of a convex body, defined as the number of distinct values a linear functional attains on the lattice points within the body. Arithmetic width refines lattice width by detecting gaps in the lattice point distribution and always provides a natural lower bound. We show that for large dilates of a convex body, the attained values form an arithmetic progression with only a bounded number of omissions near the extremes. For rational polytopes, we show that the arithmetic width grows eventually quasilinearly in the dilation parameter, with optimal directions reoccurring periodically. Lastly, we present algorithms to compute the arithmetic width. These results build new connections with discrete geometry, integer programming, and additive combinatorics.
format Preprint
id arxiv_https___arxiv_org_abs_2509_04726
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle An arithmetic measure of width for convex bodies
De Loera, Jesús A.
Marsters, Brittney
O'Neill, Christopher
Combinatorics
We introduce the arithmetic width of a convex body, defined as the number of distinct values a linear functional attains on the lattice points within the body. Arithmetic width refines lattice width by detecting gaps in the lattice point distribution and always provides a natural lower bound. We show that for large dilates of a convex body, the attained values form an arithmetic progression with only a bounded number of omissions near the extremes. For rational polytopes, we show that the arithmetic width grows eventually quasilinearly in the dilation parameter, with optimal directions reoccurring periodically. Lastly, we present algorithms to compute the arithmetic width. These results build new connections with discrete geometry, integer programming, and additive combinatorics.
title An arithmetic measure of width for convex bodies
topic Combinatorics
url https://arxiv.org/abs/2509.04726