Rational fixed points for linear group actions

Abstract

Let k be a finitely generated field, let X be an algebraic variety and G a linear algebraic group, both defined over k. Suppose G acts on X and every element of a Zariski-dense semigroup ⊂ G(k) has a rational fixed point in X(k). We then deduce, under some mild technical assumptions, the existence of a rational map G X, defined over k, sending each element g∈ G to a fixed point for g. The proof makes use of a recent result of Ferretti and Zannier on diophantine equations involving linear recurrences. As a by-product of the proof, we obtain a version of the classical Hilbert Irreducibility Theorem valid for linear algebraic groups.

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