MMP for Enriques pairs and singular Enriques varieties

Francesco Antonio Denisi, Ángel David Ríos Ortiz, Nikolaos Tsakanikas, Zhixin Xie
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Abstract

We introduce and study the class of primitive Enriques varieties, whose smooth members are Enriques manifolds. We provide several examples and we demonstrate that this class is stable under the operations of the Minimal Model Program (MMP). In particular, given an Enriques manifold $Y$ and an effective $\mathbb{R}$-divisor $B_Y$ on $Y$ such that the pair $(Y,B_Y)$ is log canonical, we prove that any $(K_Y+B_Y)$-MMP terminates with a minimal model $(Y',B_{Y'})$ of $(Y,B_Y)$, where $Y'$ is a $\mathbb{Q}$-factorial primitive Enriques variety with canonical singularities. Finally, we investigate the asymptotic theory of Enriques manifolds.
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恩里克对和奇异恩里克变种的 MMP
我们介绍并研究了一类原始恩里克流形,其光滑成员是恩里克流形。我们提供了几个例子,并证明该类在最小模型程序(MMP)的操作下是稳定的。特别是,给定一个恩里克流形$Y$和$Y$上的有效$(Y,B_Y)$分维数$B_Y$,使得这对$(Y,B_Y)$是对数、我们证明任何 $(K_Y+B_Y)$-MMP 都会以 $(Y,B_Y)$ 的最小模型$(Y',B_{Y'})$ 终止,其中$Y'$ 是一个具有对数奇异性的、$mathbb{Q}$因子基元恩里克变种。最后,我们研究了恩里克流形的渐近理论。
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A converse of Ax-Grothendieck theorem for étale endomorphisms of normal schemes MMP for Enriques pairs and singular Enriques varieties Moduli of Cubic fourfolds and reducible OADP surfaces Infinitesimal commutative unipotent group schemes with one-dimensional Lie algebra The second syzygy schemes of curves of large degree
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