Graded ideals of K\"onig type

Abstract

Inspired by the notion of K\"onig graphs we introduce graded ideals of K\"onig type with respect to a monomial order <. It is shown that if I is of K\"onig type, then the Cohen--Macaulay property of ∈i<(I) does not depend on the characteristic of the base field. This happens to be the case also for I itself when I is a binomial edge ideal. Attached to an ideal of K\"onig type is a sequence of linear forms, whose elements are variables or differences of variables. This sequence is a system of parameters for ∈i<(I), and is a potential system of parameters for I itself. We study in detail the ideals of K\"onig type among the edge ideals, binomial edge ideals and the toric ideal of a Hibi ring and use the K\"onig property to determine explicitly their canonical module.