Betti posets and the Stanley depth
Abstract
Let S be a polynomial ring and let I ⊂eq S be a monomial ideal. In this short note, we propose the conjecture that the Betti poset of I determines the Stanley projective dimension of S/I or I. Our main result is that this conjecture implies the Stanley conjecture for I, and it also implies that \[ sdepth S/I ≥ depth S/I - 1.\] Recently, Duval et al. found a counterexample to the Stanley conjecture, and their counterexample satisfies sdepth S/I = depth S/I - 1. So if our conjecture is true, then the conclusion is best possible.
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