Search

15 Sep 2011: Bisexual Galton-Watson Branching Processes with Superadditive Mating Functions [pp.585-600]. The Maximum in Critical Galton-Watson and Birth and Death Processes [pp.601-613].

15 Sep 2011: 563-584]. Bisexual Galton-Watson Branching Processes with Superadditive Mating Functions [pp. 585-600]. ... The Maximum in Critical Galton-Watson and Birth and Death Processes [pp.

15 Sep 2011: CHENG-SHANG CHANG, T. J. Watson Research Center XIULI CHAO, New Jersey Institute of Technology MICHAEL PINEDO, Columbia University RICHARD WEBER, University of Cambridge. ... Watson Research Center, PO. Box 704, Yorktown. Heights, NY 10598, USA.

15 Sep 2011: 500-509]. Asymptotic Properties of Subcritical Galton-Watson Processes [pp. 510-517]. How Many Random Digits Are Required until Given Sequences Are Obtained?

21 Nov 2018: Cutoff for Random Walk on Dynamical Erdős-Rényi Graph. Perla Sousi Sam Thomas. Abstract. We consider dynamical percolation on the complete graph Kn, where each edge refreshes itsstate at rate µ 1/n, and is then declared open with probability p =

30 Oct 2013: The expression involves an adaptation of the parabolic dimensionpreviously used by Taylor and Watson to characterize polarity for the heat equation. ... by Taylor and Watson in [15] in order to determine polarsets for the heat equation.

20 Apr 2012: For background on the critical Galton Watson tree conditioned to survive, see [16]. ... SeeCorollary 3.5 for a class of critical Galton-Watson trees with infinite variance.

25 Feb 2020: Mathematical Foundations of Infinite-DimensionalStatistical Models. In nonparametric and high-dimensional statistical models, the classical Gauss–Fisher–Le Cam theory of the optimality of maximum likelihood and Bayesianposterior inference does

4 Feb 2020: Problem 2. Suppose that τ is a Galton-Watson tree with Geometric(1/2) offspring distribution,viewed as a plane tree.

1 Jun 2017: Convergence of percolation on randomquadrangulations. Jason Miller. Cambridge. Ewain Gwynne (MIT). May 22, 2017. Jason Miller (Cambridge) Convergence of percolation on random s May 22, 2017 1 / 28. Outline. Part I: Introduction — percolation and

24 Oct 2015: Jason Miller (MIT). Liouville quantum gravity and the Brownian map. Jason Miller and Scott Sheffield. Cambridge and MIT. July 15, 2015. Jason Miller (Cambridge) LQG and TBM July 15, 2015 1 / 24. Overview. Part I: Picking surfaces at random. 1.

24 Feb 2023: Miller, J.P., Watson, S.S., Wilson, D.B. ... Annals of Probability). Miller, J.P., Watson, S.S., Wilson, D.B.

24 Feb 2023: Miller, J.P., Watson, S.S., Wilson, D.B. ... Annals of Probability). Miller, J.P., Watson, S.S., Wilson, D.B.

24 Feb 2023: Watson andwith S.S. Watson andwith E. Gwynne andwith S. Sheffield andwith E.

22 Jan 2024: 42. 14 Branching processes. 14.1 Definition. A branching process or Galton–Watson process is a random process (Xn : n 0) with thefollowing structure:.

23 Oct 2017: Kozma, Bull. Soc. Math. France 143 (2015), 265–280. 65. Galton–Watson trees with vanishing martingale limit, N.

16 Jul 2016: Kozma, Bull. Soc. Math. France 143 (2015), 265–280. 52. Galton–Watson trees with vanishing martingale limit, N.

28 Jul 2015: Po(λ) Galton-Watson tree. The results extend to graphs with prescribeddegree sequences, where cutoff is shown both for the simple and for thenon-backtracking random walk. ... Berestycki, G. Kozma, Bull. Soc. Math. France. 33. Galton–Watson trees with

28 Jul 2015: Kozma, Bull. Soc. Math. France. 22. Galton–Watson trees with vanishing martingale limit, N.

28 Jul 2015: Kozma. 6. Galton–Watson trees with vanishing martingale limit, N. Berestycki,N. Gantert, P.