Orientations, lattice polytopes, and group arrangements II: Modular and integral flow Polynomials of graphs
Author(s)
Chen, Beifang; Stanley, Richard P.
DownloadStanley_Orientations lattice.pdf (297.7Kb)
OPEN_ACCESS_POLICY
Open Access Policy
Creative Commons Attribution-Noncommercial-Share Alike
Terms of use
Metadata
Show full item recordAbstract
We study modular and integral flow polynomials of graphs by means of subgroup arrangements and lattice polytopes. We introduce an Eulerian equivalence relation on orientations, flow arrangements, and flow polytopes; and we apply the theory of Ehrhart polynomials to obtain properties of modular and integral flow polynomials. The emphasis is on the geometrical treatment through subgroup arrangements and Ehrhart polynomials. Such viewpoint leads to a reciprocity law on the modular flow polynomial, which gives rise to an interpretation on the values of the modular flow polynomial at negative integers and answers a question by Beck and Zaslavsky.
Date issued
2011-08Department
Massachusetts Institute of Technology. Department of MathematicsJournal
Graphs and Combinatorics
Publisher
Springer-Verlag
Citation
Chen, Beifang, and Richard P. Stanley. “Orientations, Lattice Polytopes, and Group Arrangements II: Modular and Integral Flow Polynomials of Graphs.” Graphs and Combinatorics (2011).
Version: Author's final manuscript
ISSN
0911-0119
1435-5914