On the profile of trees with a given degree sequence

Abstract

A degree sequence is a sequence s=(Ni,i≥ 0) of non-negative integers satisfying 1+Σi iNi=Σi Ni<∞. We are interested in the uniform distribution P s on rooted plane trees whose degree sequence equals s, giving conditions for the convergence of the profile (sequence of generation sizes) as the size of the tree goes to infinity. This provides a more general formulation and a probabilistic proof of a conjecture due to Aldous (1991). Our formulation contains and extends results in this direction obtained previously by Drmota and Gittenberger (1997) and Kersting (2011). A technical result is needed to ensure that trees with law P s have enough individuals in the first generations, and this is handled through novel path transformations and fluctuation theory of exchangeable increment processes. As a consequence, we obtain a boundedness criterion for the inhomogeneous continuum random tree introduced by Aldous, Miermont and Pitman (2004).