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DOMINIC WELSH (1938–2023) GEOFFREY R. GRIMMETT If the principal ...
www.statslab.cam.ac.uk/~grg/papers/welsh1.pdf1 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 -
NEW FRONTIERS IN RANDOM GEOMETRY (RaG) EP/103372X/1 REPORT 1/7/14 ...
www.statslab.cam.ac.uk/~grg/rag-reports/report2015.pdf28 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 -
Liouville quantum gravity and the Brownian map
www.statslab.cam.ac.uk/~jpm205/slides/lqg_tbm_equivalence_oxford_2015.pdf24 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. -
NEW FRONTIERS IN RANDOM GEOMETRY (RaG)EP/I03372X/1 REPORT 1/7/15 – ...
www.statslab.cam.ac.uk/~grg/rag-reports/report2016.pdf16 Jul 2016: Kozma, Bull. Soc. Math. France 143 (2015), 265–280. 52. Galton–Watson trees with vanishing martingale limit, N. -
Convergence of percolation on random quadrangulations
www.statslab.cam.ac.uk/~jpm205/slides/percolation_convergence_oxford_may_2017.pdf1 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 -
NEW FRONTIERS IN RANDOM GEOMETRY (RaG)EP/103372X/1 REPORT 1/7/13 – ...
www.statslab.cam.ac.uk/~grg/rag-reports/report2014.pdf28 Jul 2015: Kozma, Bull. Soc. Math. France. 22. Galton–Watson trees with vanishing martingale limit, N. -
Harry Kesten (1931–2019) A personal and scientific tribute Geoffrey…
www.statslab.cam.ac.uk/~grg/papers/kesten-ams3-small.pdf20 Mar 2020: to the discretecase. Branching processes. The branching process (sometimes called the Galton–Watson process) is arguably the most fundamentalstochastic model for population growth. ... Stigum, A limit theorem for multidi-mensional Galton–Watson -
NEW FRONTIERS IN RANDOM GEOMETRY (RaG)EP/I03372X/1 REPORT 1/7/16 – ...
www.statslab.cam.ac.uk/~grg/rag-reports/report2017.pdf23 Oct 2017: Kozma, Bull. Soc. Math. France 143 (2015), 265–280. 65. Galton–Watson trees with vanishing martingale limit, N. -
UNIVERSITY OF CAMBRIDGE Faculty of Mathematics SCHEDULES OF LECTURE…
www.statslab.cam.ac.uk/~lab85/resources/schedules1819.pdf2 May 2023: UNIVERSITY OF CAMBRIDGE. Faculty of Mathematics. SCHEDULES OF LECTURE COURSES. AND FORM OF EXAMINATIONS. FOR THE MATHEMATICAL TRIPOS 2018/2019. INTRODUCTION 1. THE MATHEMATICAL TRIPOS 2018–2019. CONTENTS. This booklet is the formal description of -
rctree.dvi
www.statslab.cam.ac.uk/~grg/papers/USrctree.pdf15 Aug 2012: We consider a (Galton–Watson) branching process with family-size probabilitygenerating function G satisfying. ... Consider a multi-type (Galton–Watson) branching process with a set I of types;I may be finite or countably infinite.
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