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Zero-Separating Invariants for Linear Algebraic Groups

Published online by Cambridge University Press:  22 December 2015

Jonathan Elmer
Affiliation:
University of Aberdeen, King's College, Aberdeen AB24 3UE, UK (j.elmer@abdn.ac.uk)
Martin Kohls
Affiliation:
, Technische Universität München, Zentrum Mathematik-M11, Boltzmannstrasse 3, 85748 Garching, Germany (kohls@ma.tum.de)

Abstract

Abstract Let G be a linear algebraic group over an algebraically closed field 𝕜 acting rationally on a G-module V with its null-cone. Let δ(G, V) and σ(G, V) denote the minimal number d such that for every and , respectively, there exists a homogeneous invariant f of positive degree at most d such that f(v) ≠ 0. Then δ(G) and σ(G) denote the supremum of these numbers taken over all G-modules V. For positive characteristics, we show that δ(G) = ∞ for any subgroup G of GL2(𝕜) that contains an infinite unipotent group, and σ(G) is finite if and only if G is finite. In characteristic zero, δ(G) = 1 for any group G, and we show that if σ(G) is finite, then G0 is unipotent. Our results also lead to a more elementary proof that βsep(G) is finite if and only if G is finite.

Type
Research Article
Copyright
Copyright © Edinburgh Mathematical Society 2016 

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