A recursive distribution equation for the stable tree

Abstract

We provide a new characterisation of Duquesne and Le Gall's α-stable tree, α∈(1,2], as the solution of a recursive distribution equation (RDE) of the form Td=g(,Ti, i≥0), where g is a concatenation operator, = (i, i≥ 0) a sequence of scaling factors, Ti, i ≥ 0, and T are i.i.d. trees independent of . This generalises a version of the well-known characterisation of the Brownian Continuum Random Tree due to Aldous, Albenque and Goldschmidt. By relating to previous results on a rather different class of RDE, we explore the present RDE and obtain for a large class of similar RDEs that the fixpoint is unique (up to multiplication by a constant) and attractive.