Abstract
Nagel and Römer introduced the class of weakly vertex decomposable simplicial complexes, which include matroid, shifted, and Gorenstein complexes as well as vertex decomposable complexes. They proved that the Stanley–Reisner ideal of every weakly vertex decomposable simplicial complex is Gorenstein linked to an ideal of indeterminates via a sequence of basic double G-links. In this paper, we explore basic double G-links between squarefree monomial ideals beyond the weakly vertex decomposable setting.
Our first contribution is a structural result about certain basic double G-links which involve an edge ideal. Specifically, suppose is the edge ideal of a graph . When is a basic double G-link of a monomial ideal on an arbitrary homogeneous ideal , we give a generating set for in terms of and show that this basic double G-link must be of degree . Our second focus is on examples from the literature of simplicial complexes known to be Cohen–Macaulay but not weakly vertex decomposable. We show that these examples are not basic double G-links of any other squarefree monomial ideals.
Citation
Patricia Klein. Matthew Koban. Jenna Rajchgot. "ON BASIC DOUBLE G-LINKS OF SQUAREFREE MONOMIAL IDEALS." J. Commut. Algebra 16 (2) 213 - 229, Summer 2024. https://doi.org/10.1216/jca.2024.16.213
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