Enumeration in torus arrangements
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Publication:2275476
DOI10.1016/j.ejc.2011.02.003zbMath1229.05023OpenAlexW2076080209MaRDI QIDQ2275476
Publication date: 9 August 2011
Published in: European Journal of Combinatorics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.ejc.2011.02.003
Exact enumeration problems, generating functions (05A15) Combinatorial aspects of finite geometries (05B25)
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Cites Work
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- Affine and toric hyperplane arrangements
- A combinatorial perspective on the Radon convexity theorem
- A combinatorial analysis of topological dissections
- On classification of toric singularities
- Syzygies of oriented matroids
- Characteristic polynomials, Ehrhart quasi-polynomials, and torus groups.
- Characteristic polynomials of subspace arrangements and finite fields
- Facing up to arrangements: face-count formulas for partitions of space by hyperplanes
- Counting the faces of cut-up spaces
- Partitions ofN-Space by Hyperplanes
- [https://portal.mardi4nfdi.de/wiki/Publication:5731810 On the foundations of combinatorial theory I. Theory of M�bius Functions]
