Log-concavity of level Hilbert functions and pure O-sequences

Abstract

We investigate log-concavity in the context of level Hilbert functions and pure O-sequences, two classes of numerical sequences introduced by Stanley in the late Seventies whose structural properties have since been the object of a remarkable amount of interest in combinatorial commutative algebra. However, a systematic study of the log-concavity of these sequences began only recently, thanks to a paper by Iarrobino. The goal of this note is to address two general questions left open by Iarrobino's work: 1) Given the integer pair (r,t), are all level Hilbert functions of codimension r and type t log-concave? 2) How about pure O-sequences with the same parameters? Iarrobino's main results consisted of a positive answer to 1) for r=2 and any t, and for (r,t)=(3,1). Further, he proved that the answer to 1) is negative for (r,t)=(4,1). Our chief contribution to 1) is to provide a negative answer in all remaining cases, with the exception of (r,t)=(3,2), which is still open in any characteristic. We then propose a few detailed conjectures specifically on level Hilbert functions of codimension 3 and type 2. As for question 2), we show that the answer is positive for all pairs (r,1); negative for (r,t)=(3,4); and negative for any pair (r,t) with r 4 and 2 t r+1. Interestingly, the main case that remains open is again (r,t)=(3,2). Further, we conjecture that, in analogy with the behavior of arbitrary level Hilbert functions, log-concavity fails for pure O-sequences of any codimension r 3 and type t large enough.