Lattice Structures from Planar Graphs

Lattice Structures from Planar Graphs

The set of all orientations of a planar graph with prescribed outdegrees carries the structure of a distributive lattice. This general theorem is proven in the first part of the paper. In the second part the theorem is applied to show that interesting combinatorial sets related to a planar graph hav...

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Veröffentlicht in:The Electronic journal of combinatorics 2004-02, Vol.11 (1)
1. Verfasser: Felsner, Stefan
Format: Artikel
Sprache:eng
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Zusammenfassung:The set of all orientations of a planar graph with prescribed outdegrees carries the structure of a distributive lattice. This general theorem is proven in the first part of the paper. In the second part the theorem is applied to show that interesting combinatorial sets related to a planar graph have lattice structure: Eulerian orientations, spanning trees and Schnyder woods. For the Schnyder wood application some additional theory has to be developed. In particular it is shown that a Schnyder wood for a planar graph induces a Schnyder wood for the dual.
ISSN:1077-8926
1077-8926
DOI:10.37236/1768