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Referencias:

• Addario-Berry, L., Broutin, N., Holmgren, C., Cutting down trees with a Markov chainsaw (2014) Ann. Appl. Probab., 24 (6), pp. 2297-2339
• Aldous, D., The continuum random tree. I (1991) Ann. Probab., 19, pp. 1-28
• Aldous, D., Brownian excursions, critical random graphs and the multiplicative coalescent (1997) Ann. Probab., 25 (2), pp. 812-854
• Aldous, D., Pitman, J., The standard additive coalescent (1998) Ann. Probab., 26, pp. 1703-1726
• Aldous, D.J., Deterministic and stochastic models for coalescence (aggregation, coagulation): A review of the mean-field theory for probabilists (1997) Bernoulli, 5, pp. 3-48
• Bertoin, J., A fragmentation process connected to Brownian motion (2000) Probab. Theory Relat. Fields, 117 (2), pp. 289-301
• Bertoin, J., (2006) Random Fragmentation and Coagulation Processes, , Cambridge, University Press, Cambridge
• Bertoin, J., Fires on trees (2012) Ann. Inst. Henri Poincaré Probab. Stat., 48 (4), pp. 909-921
• Bertoin, J., Miermont, G., The cut-tree of large Galton–Watson trees and the Brownian CRT (2013) Ann. Appl. Probab., 23 (4), pp. 1469-1493
• Broutin, N., Marckert, J., A new encoding of combinatorial coalescent processes. Applications to the additive and multiplicative cases (2016) Probab. Theory Relat. Fields, 166 (1), pp. 515-552
• Broutin, N., Wang, M., Cutting down p-trees and inhomogeneous continuum random trees (2017) Bernoulli, 23 (4A), pp. 2380-2433
• Chassaing, P., Louchard, G., Phase transition for parking blocks, brownian excursion and coalescence (2002) Random Struct. Algorithms, 21 (1), pp. 76-119
• Dieuleveut, D., The vertex-cut-tree of Galton–Watson trees converging to a stable tree (2015) Ann. Appl. Probab., 25 (4), pp. 2215-2262
• Dvoretzky, A., Motzkin, T., A problem of arrangements (1947) Duke Math. J., 14, pp. 305-313
• Evans, S., Pitman, J., Construction of Markovian coalescents (1998) Ann. Inst. H. Poincaré Probab. Stat., 34, pp. 339-383
• Evans, S.N., (2008) Probability and Real Trees, volume 1920 of Lecture Notes in Mathematics, , Springer, Berlin, Lectures from the 35th Summer School on Probability Theory held in Saint-Flour, July 6–23, 2005
• Fournier, N., Laurençot, P., Well-posedness of Smoluchowski's coagulation equation for a class of homogeneous kernels (2006) J. Funct. Anal., 233 (2), pp. 351-379
• Janson, S., Random cutting and records in deterministic and random trees, Random (2006) Struct. Algorithms, 29 (2), pp. 139-179
• Kaigh, W.D., An invariance principle for random walk conditioned by a late return to zero (1976) Ann. Probab., 4 (1), pp. 115-121
• Kingman, J.F.C., The coalescent (1982) Stoch. Process Appl., 13 (3), pp. 235-248
• Le Gall, J.-F., The uniform random tree in a Brownian excursion (1993) Probab. Theory Relat. Fields, 96 (3), pp. 369-383
• Lushnikov, A., Some new aspects of coagulation theory Izv. Atmos. Ocean Phys., 14 (1978), pp. 738-743
• Marcus, A., Stochastic coalescence (1968) Technometrics, 10 (1), pp. 133-143
• Meir, A., Moon, J., Cutting down random trees (1970) J. Aust. Math. Soc., 11, pp. 313-324
• Moon, J.W., On the maximum degree in a random tree (1968) Mich. Math. J., 15 (4), pp. 429-432
• Panholzer, A., Cutting down very simple trees (2006) Quaest. Math., 29, pp. 211-228
• Pitman, J., Coalescent random forests (1999) J. Combin. Theory Ser. A, 85 (2), pp. 165-193
• Pitman, J., (2006) Combinatorial Stochastic Processes, volume 1875 of Lecture Notes in Mathematics, , Springer, Berlin
• Riordan, J., Forests of cayley trees (1968) J. Comb. Theory, 5, pp. 90-103
• Smoluchowski, M., Drei Vortrage uber Diffusion, Brownsche Bewegung und Koagulation von Kolloidteilchen Physik. Zeit., 17 (1916), pp. 557-585

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