A non-Golod ring with a trivial product on its Koszul homology

Abstract

We present a monomial ideal a ⊂ S such that S/a is not Golod, even though the product on its Koszul homology is trivial. This constitutes a counterexample to a well-known result by Berglund and J\"ollenbeck (the error can be traced to a mistake in an earlier article by J\"ollenbeck). On the positive side, we show that if R is a monomial ring such that the r-ary Massey product vanish for all r ≤ (2, reg R-2), then R is Golod. In particular, if R is the Stanley-Reisner ring of a simplicial complex of dimension at most 3, then R is Golod if and only if the product on its Koszul homology is trivial. Moreover, we show that if is a triangulation of a -orientable manifold whose Stanley-Reisner ring is Golod, then is 2-neighborly. This extends a recent result of Iriye and Kishimoto.