Density of orbits of endomorphisms of commutative linear algebraic groups
Abstract
We prove a conjecture of Medvedev and Scanlon for endomorphisms of connected commutative linear algebraic groups G defined over an algebraically closed field k of characteristic 0. That is, if G G is a dominant endomorphism, we prove that one of the following holds: either there exists a non-constant rational function f∈ k(G) preserved by (i.e., f = f), or there exists a point x∈ G(k) whose -orbit is Zariski dense in G.
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