On the arithmetic Cohen-Macaulayness of varieties parameterized by Togliatti systems

Abstract

Given any diagonal cyclic subgroup ⊂ GL(n+1,k) of order d, let Id⊂ k[x0,…, xn] be the ideal generated by all monomials \m1,…, mr\ of degree d which are invariants of . Id is a monomial Togliatti system, provided r ≤ d+n-1n-1, and in this case the projective toric variety Xd parameterized by (m1,…, mr) is called a GT-variety with group . We prove that all these GT-varieties are arithmetically Cohen-Macaulay and we give a combinatorial expression of their Hilbert functions. In the case n=2, we compute explicitly the Hilbert function, polynomial and series of Xd. We determine a minimal free resolution of its homogeneous ideal and we show that it is a binomial prime ideal generated by quadrics and cubics. We also provide the exact number of both types of generators. Finally, we pose the problem of determining whether a surface parameterized by a Togliatti system is aCM. We construct examples that are aCM and examples that are not.