On lattices over Fermat function fields

Abstract

Function field lattices are an interesting example of algebraically constructed lattices. Their minimum distance is bounded below by a function of the gonality of the underlying function field. Known explicit examples--coming mostly from elliptic and Hermitian curves--typically meet this lower bound. In this paper, we construct, for every integer n ≥slant 4, a new family of lattices arising from the Fermat function field Fn and the set of its 3n total inflection points. These lattices have rank 3n-1, and we show that their minimum distance equals 2n, thereby exceeding the classical bound 2γ(Fn) = 2(n-1). We also determine their kissing number, which turns out to be independent of n, and analyze the structure of the second shortest vectors. Our results provide the first explicit examples of function field lattices of arbitrarily large rank whose minimum distance surpasses the expected bound, offering new geometric features of potential interest for coding-theoretic and cryptographic applications.

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