On the Medvedev-Scanlon Conjecture for Minimal Threefolds of Non-Negative Kodaira Dimension

Abstract

Motivated by work of Zhang from the early `90s, Medvedev and Scanlon formulated the following conjecture. Let K be an algebraically closed field of characteristic 0 and let X be a quasiprojective variety defined over K endowed with a dominant rational self-map . Then there exists a point α∈ X(K) with Zariski dense orbit under if and only if preserves no nontrivial rational fibration, i.e., there exists no non-constant rational function f∈ K(X) such that *(f)=f. The Medvedev-Scanlon conjecture holds when K is uncountable. The case where K is countable (e.g., K=Q) is much more difficult; here the conjecture has only been proved in a small number of special cases. In this paper we show that the Medvedev-Scanlon conjecture holds for all varieties of positive Kodaira dimension, and explore the case of Kodaira dimension 0. Our results are most complete in dimension 3.