Advanced search
Publication Cover
AKCE International Journal of Graphs and Combinatorics Volume 16, 2019 - Issue 1: Special Issue: Special Issue: International Conference on Discrete Mathematics
Submit an article Journal homepage
342
Views
0
CrossRef citations to date
0
Altmetric
Original Article

Face counting formula for toric arrangements defined by root systemsFootnote

Priyavrat Deshpande Chennai Mathematical Institute, IndiaCorrespondence[email protected] [email protected]
&
Kavita Sutar Chennai Mathematical Institute, India
Pages 66-77 | Received 31 May 2017, Accepted 06 Jul 2018, Published online: 10 Jun 2020

References

  • Grünbaum B. Arrangements and Spreads CBMS Reg. Conf. Ser. Math. vol. 10 (1972) American Mathematical Society. Providence, R.I.. iv+114.
  • Grünbaum B. Convex Polytopes Pure and Applied Mathematics vol. 16 (1967) Wiley Interscience. New York. xiv+456.
  • Stanley R.P. An introduction to hyperplane arrangements Geometric Combinatorics IAS/Park City Math. Ser. vol. 13 (2007) Amer. Math. Soc.. Providence, RI. 389–496.
  • Zaslavsky T. Facing up to arrangements: face-count formulas for partitions of space by hyperplanes Mem. Amer. Math. Soc. 1 1 Special Issue: Special Issue: International Conference on Discrete Mathematics 1975 154
  • Zaslavsky T. A combinatorial analysis of topological dissections Adv. Math. 25 3 1977 267 285
  • Ehrenborg R. Readdy M. Slone M. Affine and toric hyperplane arrangements Discrete Comput. Geom. 41 4 2009 481 512
  • Lawrence J. Enumeration in torus arrangements European J. Combin. 32 6 2011 870 881
  • Deshpande P. On a generalization of Zaslavsky’s theorem for hyperplane arrangements Ann. Comb. 18 1 Special Issue: Special Issue: International Conference on Discrete Mathematics 2014 35 55
  • Shnurnikov I.N. On the number of regions formed by sets of closed geodesics on flat surfaces Mat. Zametki 90 4 2011 637 640
  • I. Shnurnikov, On the number of connected components of complements to arrangements of subtori http://arxiv:1412.8722 [math.AT].
  • K. Chandrashekhar, P. Deshpande, Face enumeration for line arrangements in a 2-torus http://arxiv:1404.1665 [math.CO].
  • Stanley R.P. Enumerative Combinatorics. Volume 1 Cambridge Studies in Advanced Mathematics vol. 49 (1997) Cambridge University Press. Cambridge. xiv+626.
  • Humphreys J.E. Reflection Groups and Coxeter Groups Cambridge Studies in Advanced Mathematics vol. 29 (1990) Cambridge University Press. Cambridge. xii+204.
  • Klee V. A combinatorial analogue of Poincaré’s duality theorem Canad. J. Math. 16 1964 517 531
  • Kozlov D. Combinatorial Algebraic Topology Algorithms and Computation in Mathematics vol. 21 (2008) Springer. Berlin. xx+389.
  • Brenti F. Welker V. f-vectors of barycentric subdivisions Math. Z. 259 4 2008 849 865

Related research

People also read lists articles that other readers of this article have read.

Recommended articles lists articles that we recommend and is powered by our AI driven recommendation engine.

Cited by lists all citing articles based on Crossref citations.
Articles with the Crossref icon will open in a new tab.