Relative dynamical degrees of correspondences over a field of arbitrary characteristic

Abstract

Let K be an algebraically closed field of arbitrary characteristic, X an irreducible variety and Y an irreducible projective variety over K, both are not necessarily smooth. Let f:X→ X and g:Y→ Y be dominant correspondences, and π :X→ Y a dominant rational map such that π f=g π. We define relative dynamical degrees λ p(f|π ) (p=0,… , (X)- (Y)). These degrees measure the relative growth of positive algebraic cycles, satisfy a product formula when Y is smooth and g is a multiple of a rational map, and are birational invariants. More generally, a weaker product formula is proven for more general semi-conjugacies, and for any generically finite semi-conjugacy ( , ) from (X2,f2)→ (Y2,g2) to (X1,f1)→ (Y1,g1) we have λ p(f1|π 1)≥ λ p(f2|π 2) for all p. Many of our results are new even when K=C. We make use of de Jong's alterations and Roberts' version of Chow's moving lemma. In the lack of resolution of singularities, the consideration of correspondences is necessary even when f,g are rational maps. The case K is not algebraically closed further requires working with correspondences over reducible varieties.