English

Automorphism Groups of Comparability Graphs

Discrete Mathematics 2015-06-17 v1 Combinatorics

Abstract

Comparability graphs are graphs which have transitive orientations. The dimension of a poset is the least number of linear orders whose intersection gives this poset. The dimension dim(X){\rm dim}(X) of a comparability graph XX is the dimension of any transitive orientation of X, and by kk-DIM we denote the class of comparability graphs XX with dim(X)k{\rm dim}(X) \le k. It is known that the complements of comparability graphs are exactly function graphs and permutation graphs equal 2-DIM. In this paper, we characterize the automorphism groups of permutation graphs similarly to Jordan's characterization for trees (1869). For permutation graphs, there is an extra operation, so there are some extra groups not realized by trees. For k4k \ge 4, we show that every finite group can be realized as the automorphism group of some graph in kk-DIM, and testing graph isomorphism for kk-DIM is GI-complete.

Keywords

Cite

@article{arxiv.1506.05064,
  title  = {Automorphism Groups of Comparability Graphs},
  author = {Pavel Klavík and Peter Zeman},
  journal= {arXiv preprint arXiv:1506.05064},
  year   = {2015}
}
R2 v1 2026-06-22T09:54:43.605Z