Commutative algebras for arrangements

Peter Orlik; Hiroaki Terao

doi:10.1017/S0027763000004852

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Let V be a vector space of dimension l over some field K. A hyperplane H is a vector subspace of codimension one. An arrangement is a finite collection of hyperplanes in V. We use [7] as a general reference.

References

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Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Orlik, Peter and Terao, Hiroaki 1995. Arrangements and Milnor fibers. Mathematische Annalen, Vol. 301, Issue. 1, p. 211.

Forge, David and Las Vergnas, Michel 2001. Orlik–Solomon Type Algebras. European Journal of Combinatorics, Vol. 22, Issue. 5, p. 699.

Terao, Hiroaki 2002. Algebras Generated by Reciprocals of Linear Forms. Journal of Algebra, Vol. 250, Issue. 2, p. 549.

Forge, David 2002. Bases in Orlik–Solomon Type Algebras. European Journal of Combinatorics, Vol. 23, Issue. 5, p. 567.

Horiuchi, Hiroki and Terao, Hiroaki 2003. The Poincaré series of the algebra of rational functions which are regular outside hyperplanes. Journal of Algebra, Vol. 266, Issue. 1, p. 169.

Berget, Andrew 2010. Products of linear forms and Tutte polynomials. European Journal of Combinatorics, Vol. 31, Issue. 7, p. 1924.

Ardila, Federico and Postnikov, Alexander 2010. Combinatorics and geometry of power ideals. Transactions of the American Mathematical Society, Vol. 362, Issue. 8, p. 4357.

Schenck, H. 2010. Resonance Varieties Via Blowups of P2 and Scrolls. International Mathematics Research Notices,

Holtz, Olga and Ron, Amos 2011. Zonotopal algebra. Advances in Mathematics, Vol. 227, Issue. 2, p. 847.

Lenz, Matthias 2012. Hierarchical zonotopal power ideals. European Journal of Combinatorics, Vol. 33, Issue. 6, p. 1120.

Van Le, Dinh and Römer, Tim 2013. Broken circuit complexes and hyperplane arrangements. Journal of Algebraic Combinatorics, Vol. 38, Issue. 4, p. 989.

Schenck, Hal and Sidman, Jessica 2013. Commutative Algebra. p. 639.

Le, Dinh Van 2014. On the Gorensteinness of broken circuit complexes and Orlik–Terao ideals. Journal of Combinatorial Theory, Series A, Vol. 123, Issue. 1, p. 169.

Denham, Graham Garrousian, Mehdi and Tohǎneanu, Ştefan O. 2014. Modular Decomposition of the Orlik-Terao Algebra. Annals of Combinatorics, Vol. 18, Issue. 2, p. 289.

Garrousian, Mehdi and Tohǎneanu, Ştefan O. 2015. Minimum distance of linear codes and the α-invariant. Advances in Applied Mathematics, Vol. 71, Issue. , p. 190.

Le, Dinh Van and Mohammadi, Fatemeh 2015. On the Orlik–Terao ideal and the relation space of a hyperplane arrangement. Advances in Applied Mathematics, Vol. 71, Issue. , p. 34.

Aomoto, Kazuhiko and Machida, Yoshinori 2015. Some problems of hypergeometric integrals associated with hypersphere arrangement. Proceedings of the Japan Academy, Series A, Mathematical Sciences, Vol. 91, Issue. 6,

Lenz, Matthias 2016. Zonotopal algebra and forward exchange matroids. Advances in Mathematics, Vol. 294, Issue. , p. 819.

Lenz, Matthias 2016. Splines, lattice points, and arithmetic matroids. Journal of Algebraic Combinatorics, Vol. 43, Issue. 2, p. 277.

Liu, Ricky Ini 2016. On the commutative quotient of Fomin–Kirillov algebras. European Journal of Combinatorics, Vol. 54, Issue. , p. 65.

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