Search

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

21 Oct 2020: J.C.Gittins R.M.Loynes D.Mollison B.J.T.Morgan R.Morgan F.Papangelou M.J.Prentice R.Sibson S.R.Watson D.Williams.

24 Apr 2018: Galton–Watson trees with vanishing martingale limit.

19 Jun 2024: Search site. Statistical Laboratory. History of the Statistical Laboratory. A Realised Path. The Cambridge Statistical Laboratory upto 1993 (revised 2002). Contents. 1. 1947-55 Creation and confirmation. 1955-61 Disaster and diaspora. 1961-66 The

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.

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

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:.

21 Oct 2020: Gordon. A.W.F.Edwards J.L.Teugels S.R.Watson D.M.Titterington M.Elion R.L.Tweedie J.A.Lambert S.Chinn S.M.Leonard W.J.Anderson.

28 Jul 2015: Kozma5. Galton–Watson trees with vanishing martingale limit, N. Berestycki,. N. Gantert, P.

31 Oct 2023: UNIVERSITY OF CAMBRIDGE. Faculty of Mathematics. SCHEDULES OF LECTURE COURSES. AND FORM OF EXAMINATIONS. FOR THE MATHEMATICAL TRIPOS 2023-24. Revised 21 August 2023. TERM COURSES. 24 24 24 24 101 Vectors and Matrices Differential Equations Groups

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

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.

18 Oct 2021: Kesten and B. P. Stigum. Additional limit theorems for in-decomposable multidimensional Galton–Watson processes. ... A limit theorem for multidimen-sional Galton–Watson processes. Ann. Math. Statist., 37:1211–1223, 1966.

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

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

1 May 2024: His 39 years as a Fellow have been exceeded by only few in recent times,including by his colleague Philip Watson (Fellow, 1950–1993), with whomDominic shared the privilege of teaching

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 =

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

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

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.