Products of Ideals and Golod Rings
Abstract
In this paper, we study conditions guaranteeing that a product of ideals defines a Golod ring. We show that for a 3-dimensional regular local ring (or 3-variable polynomial ring) (R , ), the ideal I always defines a Golod ring for any proper ideal I ⊂ R. We also show that non-Golod products of ideals are ubiquitous; more precisely, we prove that for any proper ideal with grade ≥ 4, there exists an ideal J ⊂eq I such that IJ is not Golod. We conclude by showing that if I is any proper ideal in a 3-dimensional regular local ring and ⊂eq I a complete intersection, then I is Golod.
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