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21 - 30 of 42 search results for watson |u:www.statslab.cam.ac.uk

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  2. DOMINIC WELSH (1938–2023) GEOFFREY R. GRIMMETT If the principal ...

    www.statslab.cam.ac.uk/~grg/papers/welsh1.pdf
    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

  3. NEW FRONTIERS IN RANDOM GEOMETRY (RaG) EP/103372X/1 REPORT 1/7/14 ...

    www.statslab.cam.ac.uk/~grg/rag-reports/report2015.pdf
    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

  4. Liouville quantum gravity and the Brownian map

    www.statslab.cam.ac.uk/~jpm205/slides/lqg_tbm_equivalence_oxford_2015.pdf
    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.

  5. NEW FRONTIERS IN RANDOM GEOMETRY (RaG)EP/I03372X/1 REPORT 1/7/15 – ...

    www.statslab.cam.ac.uk/~grg/rag-reports/report2016.pdf
    16 Jul 2016: Kozma, Bull. Soc. Math. France 143 (2015), 265–280. 52. Galton–Watson trees with vanishing martingale limit, N.

  6. Convergence of percolation on random quadrangulations

    www.statslab.cam.ac.uk/~jpm205/slides/percolation_convergence_oxford_may_2017.pdf
    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

  7. NEW FRONTIERS IN RANDOM GEOMETRY (RaG)EP/103372X/1 REPORT 1/7/13 – ...

    www.statslab.cam.ac.uk/~grg/rag-reports/report2014.pdf
    28 Jul 2015: Kozma, Bull. Soc. Math. France. 22. Galton–Watson trees with vanishing martingale limit, N.

  8. Harry Kesten (1931–2019) A personal and scientific tribute Geoffrey…

    www.statslab.cam.ac.uk/~grg/papers/kesten-ams3-small.pdf
    20 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

  9. NEW FRONTIERS IN RANDOM GEOMETRY (RaG)EP/I03372X/1 REPORT 1/7/16 – ...

    www.statslab.cam.ac.uk/~grg/rag-reports/report2017.pdf
    23 Oct 2017: Kozma, Bull. Soc. Math. France 143 (2015), 265–280. 65. Galton–Watson trees with vanishing martingale limit, N.

  10. UNIVERSITY OF CAMBRIDGE Faculty of Mathematics SCHEDULES OF LECTURE…

    www.statslab.cam.ac.uk/~lab85/resources/schedules1819.pdf
    2 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

  11. rctree.dvi

    www.statslab.cam.ac.uk/~grg/papers/USrctree.pdf
    15 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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