The asymptotic number of occurrences of a subtree in trees with bounded maximum degree and an application to the Estrada index

Abstract

Let Tn denote the set of trees of order n, in which the degree of each vertex is bounded by some integer . Suppose that every tree in Tn is equally likely. For any given subtree H, we show that the number of occurrences of H in trees of Tn is with mean (μH+o(1))n and variance (σH+o(1))n, where μH, σH are some constants. As an application, we estimate the value of the Estrada index EE for almost all trees in Tn, and give an explanation in theory to the approximate linear correlation between EE and the first Zagreb index obtained by quantitative analysis.