Normal cyclic polytopes and cyclic polytopes that are not very ample

Abstract

Let d and n be positive integers with n ≥ d + 1 and τ1, ..., τn integers with τ1 < ... < τn. Let Cd(τ1, ..., τn) ⊂ d denote the cyclic polytope of dimension d with n vertices (τ1,τ12,...,τ1d), ..., (τn,τn2,...,τnd). We are interested in finding the smallest integer γd such that if τi+1 - τi ≥ γd for 1 ≤ i < n, then Cd(τ1, ..., τn) is normal. One of the known results is γd ≤ d (d + 1). In the present paper a new inequality γd ≤ d2 - 1 is proved. Moreover, it is shown that if d ≥ 4 with τ3 - τ2 = 1, then Cd(τ1, ..., τn) is not very ample.