Algebraic dynamics of skew-linear self-maps

Abstract

Let X be a variety defined over an algebraically closed field k of characteristic 0, let N∈N, let g:X X be a dominant rational self-map, and let A:AN AN be a linear transformation defined over k(X), i.e., for a Zariski open dense subset U⊂ X, we have that for x∈ U(k), the specialization A(x) is an N-by-N matrix with entries in k. We let f:X×AN X× AN be the rational endomorphism given by (x,y) (g(x), A(x)y). We prove that if the determinant of A is nonzero and if there exists x∈ X(k) such that its orbit Og(x) is Zariski dense in X, then either there exists a point z∈ (X× AN)(k) such that its orbit Of(z) is Zariski dense in X× AN or there exists a nonconstant rational function ∈ k(X× AN) such that f=. Our result provides additional evidence to a conjecture of Medvedev and Scanlon.