English

Independent set and matching permutations

Combinatorics 2021-07-14 v2

Abstract

Let GG be a graph GG whose largest independent set has size mm. A permutation π\pi of {1,,m}\{1, \ldots, m\} is an {\em independent set permutation} of GG if aπ(1)(G)aπ(2)(G)aπ(m)(G) a_{\pi(1)}(G) \leq a_{\pi(2)}(G) \leq \cdots \leq a_{\pi(m)}(G) where ak(G)a_k(G) is the number of independent sets of size kk in GG. In 1987 Alavi, Malde, Schwenk and Erd\H{o}s proved that every permutation of {1,,m}\{1, \ldots, m\} is an independent set permutation of some graph with α(G)=m\alpha(G)=m, i.e. with largest independent set having size mm. They raised the question of determining, for each mm, the smallest number f(m)f(m) such that every permutation of {1,,m}\{1, \ldots, m\} is an independent set permutation of some graph with α(G)=m\alpha(G)=m and with at most f(m)f(m) vertices, and they gave an upper bound on f(m)f(m) of roughly m2mm^{2m}. Here we settle the question, determining f(m)=mmf(m)=m^m, and make progress on a related question, that of determining the smallest order such that every permutation of {1,,m}\{1, \ldots, m\} is the {\em unique} independent set permutation of some graph of at most that order. More generally we consider an extension of independent set permutations to weak orders, and extend Alavi et al.'s main result to show that every weak order on {1,,m}\{1, \ldots, m\} can be realized by the independent set sequence of some graph with α(G)=m\alpha(G)=m and with at most mm+2m^{m+2} vertices. Alavi et al. also considered {\em matching permutations}, defined analogously to independent set permutations. They observed that not every permutation of {1,,m}\{1,\ldots,m\} is a matching permutation of some graph with largest matching having size mm, putting an upper bound of 2m12^{m-1} on the number of matching permutations of {1,,m}\{1,\ldots,m\}. Confirming their speculation that this upper bound is not tight, we improve it to O(2m/m)O(2^m/\sqrt{m}).

Keywords

Cite

@article{arxiv.1901.06579,
  title  = {Independent set and matching permutations},
  author = {Taylor Ball and David Galvin and Catherine Hyry and Kyle Weingartner},
  journal= {arXiv preprint arXiv:1901.06579},
  year   = {2021}
}

Comments

Revised to improve presentation. To appear in Journal of Graph Theory

R2 v1 2026-06-23T07:16:43.358Z