Depth and minimal number of generators of square free monomial ideals
Abstract
Let I be an ideal of a polynomial algebra S over a field generated by square free monomials of degree ≥ d. If I contains more monomials of degree d than (n-d)/(n-d+1) of the total number of square free monomials of S of degree d+1 then SI≤ d, in particular the Stanley's Conjecture holds in this case.
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