Geometry of numbers and degree bounds for rational invariants

Abstract

We investigate degree bounds for fields of rational invariants of representations of finite groups. We prove many cases of a bound for Z/pZ conjectured by Blum-Smith, Garcia, Hidalgo, and Rodriguez. For arbitrary groups, we also prove a new bound on the minimum degree d such that the polynomials of degree ≤ d span the field of rational functions as a vector space over the invariant field. This latter quantity also bounds the degree d such that the polynomials of degree ≤ d contain a copy of the regular representation of G, advancing an inquiry of Koll\'ar and Tiep. The methods involve Euclidean lattices and Minkowski's geometry of numbers.