Optimal upper bounds for anti-canonical volumes of singular toric Fano varieties
Abstract
Fix two positive integers d≥3 and q. We give an upper bound for anti-canonical volumes of d-dimensional 1q-lc toric Fano varieties, which corresponds to an upper bound for the dual normalized volumes of the associated d-dimensional 1q-lc Fano polytopes. And we also construct examples to show that these upper bounds are optimal. Besides, we provide an optimal upper bound for volumes of d-dimensional lattice simplices S such that 1qS has exactly one interior lattice point.
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