Polarized endomorphisms of Fano varieties with complements
Abstract
Let X be a Fano type variety and (X,) be a log Calabi-Yau pair with a Weil divisor. If (X,) admits a polarized endomorphism, then we show that (X,) is a finite quotient of a toric pair. Along the way, we prove that a klt Calabi-Yau pair (X,) with standard coefficients that admits a polarized endomorphism is the quotient of an abelian variety.
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