Asymptotic hollowness of lattice simplices

Abstract

An (n-1)-tuple a = (a(1), …, a(n-1)) consisting of positive integers is said to be asymptotically hollow if there exist infinitely many positive integers N such that the convex hull, K(a(n)), in n-dimensional Euclidean space of \ 0,e1, …, en-1, α(N)T\ is hollow (has no lattice points in its interior), where ei run over all but the last standard basis elements, and α(N) is the row (a(1), …, a(N-1), N). The tuple is trivial if a(i) = 1. Nontrivial asymptotically hollow tuples are characterized in terms of modular inequalities, and turn out to be rare. We show that for a tuple a, there exists an effectively computable constant C (depending on a) such that if for some N > C, K(α(N)) is (not) hollow, then for all M > C, K(α(M)) is (not) hollow (respectively). When n = 4, the nontrivial asymptotically hollow triples are completely determined; there are eleven of them, together with a one-parameter family.