On the Kawaguchi--Silverman Conjecture for birational automorphisms of irregular varieties
Abstract
We study the main open parts of the Kawaguchi--Silverman Conjecture, asserting that for a birational self-map f of a smooth projective variety X defined over Q, the arithmetic degree αf(x) exists and coincides with the first dynamical degree δf for any Q-point x of X with a Zariski dense orbit. Among other results, we show that this holds when X has Kodaira dimension zero and irregularity q(X) X -1 or X is an irregular threefold (modulo one possible exception). We also study the existence of Zariski dense orbits, with explicit examples.
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