Invariant rational functions under rational transformations

Abstract

Let X be an algebraic variety equipped with a dominant rational self-map φ:X X. A new quantity measuring the interaction of (X,φ) with trivial dynamical systems is introduced; the stabilised algebraic dimension of (X,φ) captures the maximum number of new algebraically independent invariant rational functions on the cartesian product of (X, φ) and (Y, ), as (Y,) ranges over all algebraic dynamical systems. It is shown that this birational invariant agrees with the maximum dimension of a dominant equivariant rational image (X',φ') where φ' is part of an algebraic group action on X'. As a consequence, it is deduced that if some cartesian power of (X,φ) admits a nonconstant invariant rational function, then already the second cartesian power does.