Cellular resolutions of second powers of square-free monomial ideals with divisibility relations
Abstract
Using divisibility relations between the generators of a square-free monomial ideal I, we describe divisibility relations between the generators of the second power I2. We then employ discrete Morse theory to produce a cellular free resolution of I2 which is minimal for specific ideals that are extremal with respect to a given divisibility relation. In particular, we provide sharp bounds on the projective dimension of I2 when the generators of I satisfy at least one divisibility relation.
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