The Koszul property of pinched Veronese varieties
Abstract
Let K be an arbitrary field. Let n,d 2 be positive integers. Let V(n,d) be the set of all lattice points b = (b1, ..., bn) in Nn such that Σi=1n bi = d. Let = V(n,d) \ a \ for some element a ∈ V(n,d). In this paper we prove that the semigroup ring K[] is Koszul unless d 3 and a = (0, ...,0, 2, d-2) or one of its permutations. This generalizes results of Caviglia, Conca, and Tancer.
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