Jeffrey Mermin scite author profile

We use the notion of Borel generators to give alternative methods for computing standard invariants, such as associated primes, Hilbert series, and Betti numbers, of Borel ideals. Because there are generally few Borel generators relative to ordinary generators, this enables one to do manual computations much more easily. Moreover, this perspective allows us to find new connections to combinatorics involving Catalan numbers and their generalizations. We conclude with a surprising result relating the Betti numbers of certain principal Borel ideals to the number of pointed pseudotriangulations of particular planar point sets.

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Asymptotic resurgence via integral closures

DiPasquale

Francisco

Mermin

et al. 2019

Trans. Amer. Math. Soc.

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Given an ideal in a polynomial ring, we show that the asymptotic resurgence studied by Guardo, Harbourne, and Van Tuyl can be computed using integral closures. As a consequence, the asymptotic resurgence of an ideal is the maximum of finitely many ratios involving Waldschmidt-like constants (which we call skew Waldschmidt constants) defined in terms of Rees valuations. We use this to prove that the asymptotic resurgence coincides with the resurgence if the ideal is normal (that is, all its powers are integrally closed).For a monomial ideal the skew Waldschmidt constants have an interpretation involving the symbolic polyhedron defined by Cooper, Embree, Hà, and Hoefel. Using this intuition we provide several examples of squarefree monomial ideals whose resurgence and asymptotic resurgence are different.

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Ideals containing the squares of the variables

Mermin

Peeva

Stillman

2008

Advances in Mathematics

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Generalizing the Borel property

Francisco

Mermin

Schweig

2012

Journal of the London Mathematical Society

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Jeffrey Mermin

The Eliahou-Kervaire resolution is cellular

Borel generators

Asymptotic resurgence via integral closures

Ideals containing the squares of the variables

Generalizing the Borel property

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