Betti numbers of Stanley-Reisner rings determine hierarchical Markov degrees

Abstract

There are two seemingly unrelated ideals associated with a simplicial complex . One is the Stanley-Reisner ideal I, the monomial ideal generated by minimal non-faces of , well-known in combinatorial commutative algebra. The other is the toric ideal IM() of the facet subring of , whose generators give a Markov basis for the hierarchical model defined by , playing a prominent role in algebraic statistics. In this note we show that the complexity of the generators of IM() is determined by the Betti numbers of I. The unexpected connection between the syzygies of the Stanley-Reisner ideal and degrees of minimal generators of the toric ideal provide a framework for further exploration of the connection between the model and its many relatives in algebra and combinatorics.