Graded n-Absorbing Ideals and their Combinatorial Structure
Abstract
Graded n-absorbing ideals generalize graded prime ideals by extending absorption properties to products of (n+1) homogeneous elements. We study several generalizations of graded prime ideals, including graded n-absorbing, graded weakly n-absorbing, graded strongly n-absorbing, and graded n-absorbing primary ideals, as well as related graded n-absorbing subgroups. Our primary result establishes a combinatorial model for graded n-absorbing principal monomial ideals in polynomial rings with the standard grading. By identifying principal monomial ideals with exponential vectors in Nm, we show that the graded n-absorbing principal monomial ideals correspond precisely to lattice points in the simplex \α∈ Nm: α ≤ n\. Consequently, the Hasse diagram of principal monomial ideals is realized as the 1-skeleton of the Cayley graph of Nm, yielding a geometric and combinatorial interpretation of graded n-absorption.
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