Bounding Betti numbers of monomial ideals in the exterior algebra

Abstract

Let K be a field, V a K-vector space with basis e1,…,en, and E the exterior algebra of V. To a given monomial ideal I⊂neq E we associate a special monomial ideal J with generators in the same degrees as those of I and such that the number of the minimal monomial generators in each degree of I and J coincide. We call J the colexsegment ideal associated to I. We prove that the class of strongly stable ideals in E generated in one degree satisfies the colex lower bound, that is, the total Betti numbers of the colexsegment ideal associated to a strongly stable ideal I⊂neq E generated in one degree are smaller than or equal to those of I.