Reducibility of parameter ideals in low powers of the maximal ideal
Abstract
A commutative noetherian local ring (R,m) is Gorenstein if and only if every parameter ideal of R is irreducible. Although irreducible parameter ideals may exist in non-Gorenstein rings, Marley, Rogers, and Sakurai show there exists an integer (depending on R) such that R is Gorenstein if and only if there exists an irreducible parameter ideal contained in m. We give upper bounds for that depend primarily on the existence of certain systems of parameters in low powers of the maximal ideal.
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