Asymptotic regularity of invariant chains of edge ideals
Abstract
We study chains of nonzero edge ideals that are invariant under the action of the monoid Inc of increasing functions on the positive integers. We prove that the sequence of Castelnuovo--Mumford regularity of ideals in such a chain is eventually constant with limit either 2 or 3, and we determine explicitly when the constancy behaviour sets in. This provides further evidence to a conjecture on the asymptotic linearity of the regularity of Inc-invariant chains of homogeneous ideals. The proofs reveal unexpected combinatorial properties of Inc-invariant chains of edge ideals.
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