Two problems on independent sets in graphs
Abstract
Let denote the number of independent sets of size in a graph . Levit and Mandrescu have conjectured that for all bipartite the sequence (the {\em independent set sequence} of ) 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 , and show that for any fixed 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 . We also consider the problem of estimating for in various families. We give a sharp upper bound on the number of independent sets in an -vertex graph with minimum degree , for all fixed and sufficiently large . Specifically, we show that the maximum is achieved uniquely by , the complete bipartite graph with vertices in one partition class and in the other. We also present a weighted generalization: for all fixed and , as long as is large enough, if is a graph on vertices with minimum degree then with equality if and only if .
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