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Abstract
We specify a class of graphs, H t , and characterize the irreducible decompositions of all powers of the cover ideals. This gives insight into the structure and stabilization of the corresponding associated primes; specifically, providing an answer to the question “For each integer t ≥ 0, does there exist a (hyper) graph H t such that stabilization of associated primes occurs at n ≥ (χ(H t ) −1) + t?” [Citation4]. For each t, H t has chromatic number 3 and associated primes that stabilize at n = 2 + t.
ACKNOWLEDGMENTS
Many of the results of this article started as computer experiments using the program Macaulay 2 [Citation5]. The author would like to thank Amelia Taylor for introducing her to the subject and for her invaluable support and guidance throughout the research and writing processes, Thomas Shemanske for his help in the editing process, and Adam Van Tuyl for a helpful discussion of Lemma 3.3. We also thank an anonymous referee for their insights and suggestions for improvement.
Notes
Communicated by I. Swanson.