Poincare Series of Monomial Rings with Minimal Taylor Resolution
Abstract
We give a comparison between the Poincare series of two monomial rings: R=A/I and Rq=A/Iq where Iq is a monomial ideal generated by the q'th power of monomial generators of I. We compute the Poincare series for a class of monomial rings with minimal Taylor resolution. The paper was produced during Pragmatic 2011.
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