Conditioned Galton-Watson trees: The shape functional, and more on the sum of powers of subtree sizes and its mean

Abstract

For a complex number α, we consider the sum of the αth powers of subtree sizes in Galton--Watson trees conditioned to be of size n. Limiting distributions of this functional Xn(α) have been determined for α ≠ 0, revealing a transition between a complex normal limiting distribution for α < 0 and a non-normal limiting distribution for α > 0. In this paper, we complete the picture by proving a normal limiting distribution, along with moment convergence, in the missing case α = 0. The same results are also established in the case of the so-called shape functional Xn'(0), which is the sum of the logarithms of all subtree sizes; these results were obtained earlier in special cases. Additionally, we prove convergence of all moments in the case α < 0, where this result was previously missing, and establish new results about the asymptotic mean for real α < 1/2. A novel feature for α=0 is that we find joint convergence for several α to independent limits, in contrast to the cases α≠0, where the limit is known to be a continuous function of α. Another difference from the case α≠0 is that there is a logarithmic factor in the asymptotic variance when α=0; this holds also for the shape functional. The proofs are largely based on singularity analysis of generating functions.

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