Cardinalities of the total number of independent sets

Abstract

We study the set of numbers the total number of independent sets can admit in n-vertex graphs. In this paper, we prove that the cardinality Ni(n) of this set is very close to 2n in the following sense: Ni(n)/2n = O(n-1/5) while for infinitely many n, we have 2(Ni(n)/2n) -2(1+o(1)2 n. This set is also precisely the set of possible values of the independence polynomial IG(x) at x=1 for n-vertex graphs G. As an application, we address an additive combinatorial problem on subsets of a given vector space that avoid certain intersection patterns with respect to subspaces.