THÃSE KolÃ©hÃ¨ Abdoulaye COULIBALY-PASQUIER

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Remark : We could choose E i such that ˜∇ (0,ei )(0, E i (x)) = 0 that do notchange the martingale L, but give a simple version.Remark : This martingale can be used to look at the behavior at point wherethe first singularity of the Ricci flow occurs, i.e. where the norm of the Riemanniancurvature explodes.References[1] M. Arnaudon and A. Thalmaier. Complete lifts of connections and stochasticJacobi fields. J. Math. Pures Appl. (9), 77(3):283–315, 1998.[2] Marc Arnaudon, Robert O. Bauer, and Anton Thalmaier. A probabilistic approachto the Yang-Mills heat equation. J. Math. Pures Appl. (9), 81(2):143–166, 2002.[3] Marc Arnaudon and Anton Thalmaier. Stability of stochastic differentialequations in manifolds. In Séminaire de Probabilités, XXXII, volume 1686of Lecture Notes in Math., pages 188–214. Springer, Berlin, 1998.[4] Marc Arnaudon and Anton Thalmaier. Horizontal martingales in vector bundles.In Séminaire de Probabilités, XXXVI, volume 1801 of Lecture Notes inMath., pages 419–456. Springer, Berlin, 2003.[5] Bennett Chow and Dan Knopf. The Ricci flow: an introduction, volume 110of Mathematical Surveys and Monographs. American Mathematical Society,Providence, RI, 2004.[6] M. Cranston. Gradient estimates on manifolds using coupling. J. Funct. Anal.,99(1):110–124, 1991.[7] Dennis M. DeTurck. Deforming metrics in the direction of their Ricci tensors.J. Differential Geom., 18(1):157–162, 1983.[8] K. D. Elworthy, Y. Le Jan, and Xue-Mei Li. On the geometry of diffusionoperators and stochastic flows, volume 1720 of Lecture Notes in Mathematics.Springer-Verlag, Berlin, 1999.[9] K. D. Elworthy and X.-M. Li. Formulae for the derivatives of heat semigroups.J. Funct. Anal., 125(1):252–286, 1994.6227
[10] K. D. Elworthy and M. Yor. Conditional expectations for derivatives of certainstochastic flows. In Séminaire de Probabilités, XXVII, volume 1557 of LectureNotes in Math., pages 159–172. Springer, Berlin, 1993.[11] M. Emery. Une topologie sur l’espace des semimartingales. In Séminairede Probabilités, XIII (Univ. Strasbourg, Strasbourg, 1977/78), volume 721 ofLecture Notes in Math., pages 260–280. Springer, Berlin, 1979.[12] Michel Émery. Stochastic calculus in manifolds. Universitext. Springer-Verlag,Berlin, 1989. With an appendix by P.-A. Meyer.[13] Michel Émery. On two transfer principles in stochastic differential geometry.In Séminaire de Probabilités, XXIV, 1988/89, volume 1426 of Lecture Notesin Math., pages 407–441. Springer, Berlin, 1990.[14] Richard S. Hamilton. Three-manifolds with positive Ricci curvature. J. DifferentialGeom., 17(2):255–306, 1982.[15] Elton P. Hsu. Stochastic analysis on manifolds, volume 38 of Graduate Studiesin Mathematics. American Mathematical Society, Providence, RI, 2002.[16] Jürgen Jost. Harmonic mappings between Riemannian manifolds, volume 4of Proceedings of the Centre for Mathematical Analysis, Australian NationalUniversity. Australian National University Centre for Mathematical Analysis,Canberra, 1984.[17] Jürgen Jost. Riemannian geometry and geometric analysis. Universitext.Springer-Verlag, Berlin, fourth edition, 2005.[18] Wilfrid S. Kendall. Nonnegative Ricci curvature and the Brownian couplingproperty. Stochastics, 19(1-2):111–129, 1986.[19] Shoshichi Kobayashi and Katsumi Nomizu. Foundations of differential geometry.Vol. I. Wiley Classics Library. John Wiley & Sons Inc., New York, 1996.Reprint of the 1963 original, A Wiley-Interscience Publication.[20] Hiroshi Kunita. Stochastic flows and stochastic differential equations, volume24 of Cambridge Studies in Advanced Mathematics. Cambridge UniversityPress, Cambridge, 1990.[21] John M. Lee. Riemannian manifolds, volume 176 of Graduate Texts in Mathematics.Springer-Verlag, New York, 1997. An introduction to curvature.[22] Daniel W. Stroock and S. R. Srinivasa Varadhan. Multidimensional diffusionprocesses. Classics in Mathematics. Springer-Verlag, Berlin, 2006. Reprint ofthe 1997 edition.6328
Page 1:
Université de PoitiersTHÈSEpour o
Page 4 and 5:
AbstractIn the first part of this t
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ivTABLE DES MATIÈRES3 Kendall-Cran
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8 CHAPITRE 1. INTRODUCTIONdifféren
Page 10 and 11:
10 CHAPITRE 1. INTRODUCTIONdonne se
Page 12 and 13: 12 CHAPITRE 1. INTRODUCTIONHamilton
Page 14 and 15: 14 CHAPITRE 1. INTRODUCTIONx et ell
Page 16 and 17: 16 CHAPITRE 1. INTRODUCTIONCette é
Page 18 and 19: 18 CHAPITRE 1. INTRODUCTION- Exempl
Page 20 and 21: 20 CHAPITRE 1. INTRODUCTION20
Page 22 and 23: 22CHAPITRE 2. INTRODUCTION À L’A
Page 24 and 25: 24CHAPITRE 2. INTRODUCTION À L’A
Page 26: 26CHAPITRE 2. INTRODUCTION À L’A
Page 29 and 30: 2. ÉQUATIONS DIFFÉRENTIELLES STOC
Page 31 and 32: 2. ÉQUATIONS DIFFÉRENTIELLES STOC
Page 33 and 34: 3. QUELQUES APPLICATIONS DU CALCUL
Page 35 and 36: Chapitre 3Brownian motion with resp
Page 37 and 38: for every smooth function f,is a lo
Page 39 and 40: For the solution U t of (1.1) we ge
Page 41 and 42: Remark : Recall that in the compact
Page 43 and 44: 2 Local expression, evolution equat
Page 45 and 46: The last equality comes from Green
Page 47 and 48: Theorem 3.2 For every solution f(t,
Page 49 and 50: Consequently:d(df(T − t, .) X Tt
Page 51 and 52: Proof : The first remark after theo
Page 53 and 54: Remark : Hamilton gives a proof of
Page 55 and 56: Corollary 3.7 For χ(M) < 0, there
Page 57 and 58: We also have:D S,T −t dπ ˜// 0,
Page 59 and 60: Proof : By differentiation under x
Page 61: where we have used in the second eq
Page 65 and 66: Chapter 4Some stochastic process wi
Page 67 and 68: We will just look at the smooth sol
Page 69 and 70: that is to say:d(Y T,it ) = − ∂
Page 71 and 72: 2 Tightness, and first example on t
Page 73 and 74: proof : It is clear that F is smoot
Page 75 and 76: Proposition 2.6 Let g(t) be a famil
Page 77 and 78: v) ˜g(∞) is a metric such that (
Page 79 and 80: Then:for all ɛ > 0 , there exists
Page 81 and 82: Finally, we obtain:∂∂t | t=t 0
Page 83 and 84: where Ut 3 is the horizontal lift o
Page 85 and 86: √πWe can choose ɛ, ɛ 2 such th
Page 87 and 88: We will now show that the coupling
Page 89 and 90: HenceWe get:√√ n∑1 − ɛI t
Page 91 and 92: By uniqueness in law of such proces
Page 95 and 96: Chapter 5Horizontal diffusion in pa
Page 97 and 98: 2 M. ARNAUDON, A. K. COULIBALY, AND
Page 105 and 106: 10 M. ARNAUDON, A. K. COULIBALY, AN
Page 113 and 114:
Chapter 6Compléments de calculs113
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d’avoir une famille de connexion,
Page 117 and 118:
Dans le calcul de ligne 8 à ligne
Page 119 and 120:
On utilise le fait que W (.) t est
Page 121 and 122:
Chapter 7Appendix121121
Page 123 and 124:
774 M. Arnaudon et al. / C. R. Acad
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Page 127 and 128:
Page 129 and 130:
Bibliography[ABT02]Marc Arnaudon, R
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BIBLIOGRAPHY 131[DeT83][Dri92]Denni
Page 133 and 134:
BIBLIOGRAPHY 133[Jos84][Jos05][JS03
Page 135 and 136:
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