English

Partial Graph Orientations and the Tutte Polynomial

Combinatorics 2015-03-20 v3

Abstract

Gessel and Sagan investigated the Tutte polynomial, T(x,y)T(x,y) using depth first search, and applied their techniques to show that the number of acyclic partial orientations of a graph is 2gT(3,1/2)2^gT(3,1/2). We provide a short deletion-contraction proof of this result and demonstrate that dually, the number of strongly connected partial orientations is 2n1T(1/2,3)2^{n-1}T(1/2,3). We then prove that the number of partial orientations modulo cycle reversals is 2gT(3,1)2^gT(3,1) and the number of partial orientations modulo cut reversals is 2n1T(1,3)2^{n-1}T(1,3). To prove these results, we introduce cut and cycle minimal partial orientations which provide distinguished representatives for partial orientations modulo cut and cycle reversals. These extend classes of total orientations introduced by Gioan, and Greene and Zaslavksy, and we highlight a close connection with graphic and cographic Lawrence ideals. We conclude with edge chromatic generalizations of the quantities presented, which allow for a new interpretation of the reliability polynomial for all probabilities, pp with 0<p<1/20 < p <1/2.

Keywords

Cite

@article{arxiv.1408.3962,
  title  = {Partial Graph Orientations and the Tutte Polynomial},
  author = {Spencer Backman},
  journal= {arXiv preprint arXiv:1408.3962},
  year   = {2015}
}

Comments

14 pages, 5 figures. References updated, typos corrected, and some minor improvements in exposition

R2 v1 2026-06-22T05:31:55.082Z