Polarized endomorphisms of Fano varieties with complements
Let $X$ be a Fano type variety and $(X,\Delta)$ be a log Calabi-Yau pair with $\Delta$ a Weil divisor. If $(X,\Delta)$ admits a polarized endomorphism, then we show that $(X,\Delta)$ is a finite quotient of a toric pair. Along the way, we prove that a klt Calabi-Yau pair $(X,\Delta)$ with standard c...
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| creator | Moraga, Joaquín Yáñez, José Ignacio Yeong, Wern |
| description | Let $X$ be a Fano type variety and $(X,\Delta)$ be a log Calabi-Yau pair with
$\Delta$ a Weil divisor. If $(X,\Delta)$ admits a polarized endomorphism, then
we show that $(X,\Delta)$ is a finite quotient of a toric pair. Along the way,
we prove that a klt Calabi-Yau pair $(X,\Delta)$ with standard coefficients
that admits a polarized endomorphism is the quotient of an abelian variety. |
| doi_str_mv | 10.48550/arxiv.2401.15506 |
| format | Article |
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$\Delta$ a Weil divisor. If $(X,\Delta)$ admits a polarized endomorphism, then
we show that $(X,\Delta)$ is a finite quotient of a toric pair. Along the way,
we prove that a klt Calabi-Yau pair $(X,\Delta)$ with standard coefficients
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we show that $(X,\Delta)$ is a finite quotient of a toric pair. Along the way,
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$\Delta$ a Weil divisor. If $(X,\Delta)$ admits a polarized endomorphism, then
we show that $(X,\Delta)$ is a finite quotient of a toric pair. Along the way,
we prove that a klt Calabi-Yau pair $(X,\Delta)$ with standard coefficients
that admits a polarized endomorphism is the quotient of an abelian variety.</abstract><doi>10.48550/arxiv.2401.15506</doi><oa>free_for_read</oa></addata></record> |
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| subjects | Mathematics - Algebraic Geometry |
| title | Polarized endomorphisms of Fano varieties with complements |
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