Koszul property and finite linearity defect over g-stretched local rings

Abstract

The linearity defect is a measure for the non-linearity of minimal free resolutions of modules over noetherian local rings. A tantalizing open question due to Herzog and Iyengar asks whether a noetherian local ring (R,m) is Koszul if its residue field R/m has a finite linearity defect. We provide a positive answer to this question when R is a Cohen-Macaulay local ring of almost minimal multiplicity with the residue field of characteristic zero. The proof depends on the study of noetherian local rings (R,m) such that m2 is a principal ideal, which we call g-stretched local rings. The class of g-stretched local rings subsumes stretched artinian local rings studied by Sally, and generic artinian reductions of Cohen-Macaulay local rings of almost minimal multiplicity. An essential part in the proof of our main result is a complete characterization of one-dimensional complete g-stretched local rings. Beside partial progress on Herzog-Iyengar's question, another consequence of our study is a numerical characterization of all g-stretched Koszul rings, strengthening previous work of Avramov, Iyengar, and Sega.