Characterization of Q-complex tori via endomorphisms -- an addendum to "Int-amplified endomorphisms of compact K\"ahler spaces''
Abstract
In this short note, we consider a normal compact K\"ahler klt space X whose canonical divisor KX is pseudo-effective, and give a dynamical criterion for X to be a Q-complex torus. We show that, if such X admits an int-amplified endomorphism, then X is a Q-complex torus. As an application, we prove that, if a simply connected compact K\"ahler (smooth) threefold admits an int-amplified endomorphism, then it is (projective and) rationally connected.
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