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Log Calabi-Yau structure of projective threefolds admitting polarized endomorphisms

Published 24 Apr 2022 in math.AG and math.DS | (2204.11244v2)

Abstract: Let $X$ be a normal projective variety admitting a polarized endomorphism $f$, i.e., $f*H\sim qH$ for some ample divisor $H$ and integer $q>1$. It was conjectured by Broustet and Gongyo that $X$ is of Calabi-Yau type, i.e., $(X,\Delta)$ is lc for some effective $\mathbb{Q}$-divisor such that $K_X+\Delta\sim_{\mathbb{Q}} 0$. In this paper, we establish a general guideline based on the equivariant minimal model program and the canonical bundle formula. In this way, we prove the conjecture when $X$ is a smooth projective threefold.

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