Leaf realization problem, caterpillar graphs and prefix normal words

Abstract

Given a simple graph G with n vertices and a natural number i ≤ n, let LG(i) be the maximum number of leaves that can be realized by an induced subtree T of G with i vertices. We introduce a problem that we call the leaf realization problem, which consists in deciding whether, for a given sequence of n+1 natural numbers (0, 1, …, n), there exists a simple graph G with n vertices such that i = LG(i) for i = 0, 1, …, n. We present basic observations on the structure of these sequences for general graphs and trees. In the particular case where G is a caterpillar graph, we exhibit a bijection between the set of the discrete derivatives of the form ( LG(i))1 ≤ i ≤ n - 3 and the set of prefix normal words.