On the Enumeration of Interval Graphs

Abstract

We present upper and lower bounds for the number in of interval graphs on n vertices. Answering a question posed by Hanlon, we show that the ordinary generating function I(x) = Σn 0 in\,xn for the number in of n-vertex interval graphs has radius of convergence zero. We also show that the exponential generating function J(x) = Σn 0 in\,xn/n! has radius of convergence at least 1/2.