Asymptotic Enumeration of Subclasses of Level-2 Phylogenetic Networks

Abstract

This paper studies the enumeration of seven subclasses of level-2 phylogenetic networks under various planarity and structural constraints, including terminal planar, tree-child, and galled networks. We derive their exponential generating functions, recurrence relations, and asymptotic formulas. Specifically, we show that the number of networks of size n in each class follows: \[ Nn c · nn-1 · γn, \] where c is a class-specific constant and γ is the corresponding growth rate. Our results reveal that being terminal planar can significantly reduce the growth rate of general level-2 networks, but has only a minor effect on the growth rates of tree-child and galled level-2 networks. Notably, the growth rate of 3.83 for level-2 terminal planar galled tree-child networks is remarkably close to the rate of 2.94 for level-1 networks.