The Horton-Strahler Number of Conditioned Galton-Watson Trees

Abstract

The Horton-Strahler number of a tree is a measure of its branching complexity; it is also known in the literature as the register function. We show that for critical Galton-Watson trees with finite variance conditioned to be of size n, the Horton-Strahler number grows as 122 n in probability. We further define some generalizations of this number. Among these are the rigid Horton-Strahler number and the k-ary register function, for which we prove asymptotic results analogous to the standard case.