English

Two problems on independent sets in graphs

Combinatorics 2012-06-15 v1

Abstract

Let it(G)i_t(G) denote the number of independent sets of size tt in a graph GG. Levit and Mandrescu have conjectured that for all bipartite GG the sequence (it(G))t0(i_t(G))_{t \geq 0} (the {\em independent set sequence} of GG) is unimodal. We provide evidence for this conjecture by showing that is true for almost all equibipartite graphs. Specifically, we consider the random equibipartite graph G(n,n,p)G(n,n,p), and show that for any fixed p(0,1]p\in(0,1] its independent set sequence is almost surely unimodal, and moreover almost surely log-concave except perhaps for a vanishingly small initial segment of the sequence. We obtain similar results for p=Ω~(n1/2)p=\tilde{\Omega}(n^{-1/2}). We also consider the problem of estimating i(G)=t0it(G)i(G)=\sum_{t \geq 0} i_t(G) for GG in various families. We give a sharp upper bound on the number of independent sets in an nn-vertex graph with minimum degree δ\delta, for all fixed δ\delta and sufficiently large nn. Specifically, we show that the maximum is achieved uniquely by Kδ,nδK_{\delta, n-\delta}, the complete bipartite graph with δ\delta vertices in one partition class and nδn-\delta in the other. We also present a weighted generalization: for all fixed x>0x>0 and δ>0\delta >0, as long as n=n(x,δ)n=n(x,\delta) is large enough, if GG is a graph on nn vertices with minimum degree δ\delta then t0it(G)xtt0it(Kδ,nδ)xt\sum_{t \geq 0} i_t(G)x^t \leq \sum_{t \geq 0} i_t(K_{\delta, n-\delta})x^t with equality if and only if G=Kδ,nδG=K_{\delta, n-\delta}.

Keywords

Cite

@article{arxiv.1206.3206,
  title  = {Two problems on independent sets in graphs},
  author = {David Galvin},
  journal= {arXiv preprint arXiv:1206.3206},
  year   = {2012}
}

Comments

15 pages. Appeared in Discrete Mathematics in 2011

R2 v1 2026-06-21T21:19:28.025Z