Abstract
The Joyal bijection between doubly-rooted trees and mappings can be lifted to a transformation on function space which takes tree-walks to mapping-walks. Applying known results on weak convergence of random tree walks to Brownian excursion, we give a conceptually simpler rederivation of the Aldous-Pitman (1994) result on convergence of uniform random mapping walks to reflecting Brownian bridge, and extend this result to random $p$-mappings.
Citation
David Aldous. Gregory Miermont. Jim Pitman. "Brownian Bridge Asymptotics for Random $p$-Mappings." Electron. J. Probab. 9 37 - 56, 2004. https://doi.org/10.1214/EJP.v9-186
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