Geometric interpretation of quantitative instability

Abstract

Given a real algebraic group G acting on a linear space V, a vector v∈ V is called unstable if 0∈ Gv-Gv, where the closure is taken with respect to the Zariski topology. A fundamental theorem of Kempf in geometric invariant theory states that v is unstable if and only if there is a one-parameter subgroup A of G such that Av is unstable. Assuming G is a semisimple real algebraic Q-group, we give a new proof to this result using a geometric interpretation of the setting. In the process, we also give a new proof of an effective version of this result by Shah and Yang. Our interpretation involves relating the length of vectors under a linear action to convex functions on certain -spaces, and bound the later from below by Busemann functions.