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Author: Qi Feng Publisher: ISBN: Category : Electronic dissertations Languages : en Pages : 192
Book Description
This dissertation contains three research directions. In the first direction, we use rough paths theory to study stochastic differential equations and SPDEs. We first prove convergence and the rate of convergence of the Taylor expansion for the solutions of differential equations driven by $p$-rough paths with $p>2$. The main results are the Castell expansion and the tail estimate for the remainder terms. Our results apply to differential equations driven by continuous centered Gaussian process with finite $2D~\rho-$variation and fBm with $H>1/4$. We then give a new and simple method to get a priori bounds on rough partial differential equations. The technique is based on a weak formulation of the equation and a rough version of Gronwall's lemma. The method is presented on a linear stochastic heat equation. In the second direction, we study stochastic analysis on the horizontal paths space of totally geodesic Riemannian foliations. We first develop Malliavin calculus on the horizontal path space and then prove the quasi-invariance of horizontal Wiener measure. We further prove a Log-Sobolev inequality, the improved Log-Sobolev inequality and the equivalence of two-sided uniform Ricci curvature bounds to functional inequalities. We also obtain concentration and tail estimates. In the third direction, we study Ricci flow on totally geodesic Riemannian foliations. Under the transverse Ricci flow, we prove two types of differential Harnack inequalities for the positive solutions of the heat equation. We also get a time dependent generalized curvature dimension inequality. As consequences, we get parabolic Harnack inequalities and heat kernel upper bounds.
Author: Qi Feng Publisher: ISBN: Category : Electronic dissertations Languages : en Pages : 192
Book Description
This dissertation contains three research directions. In the first direction, we use rough paths theory to study stochastic differential equations and SPDEs. We first prove convergence and the rate of convergence of the Taylor expansion for the solutions of differential equations driven by $p$-rough paths with $p>2$. The main results are the Castell expansion and the tail estimate for the remainder terms. Our results apply to differential equations driven by continuous centered Gaussian process with finite $2D~\rho-$variation and fBm with $H>1/4$. We then give a new and simple method to get a priori bounds on rough partial differential equations. The technique is based on a weak formulation of the equation and a rough version of Gronwall's lemma. The method is presented on a linear stochastic heat equation. In the second direction, we study stochastic analysis on the horizontal paths space of totally geodesic Riemannian foliations. We first develop Malliavin calculus on the horizontal path space and then prove the quasi-invariance of horizontal Wiener measure. We further prove a Log-Sobolev inequality, the improved Log-Sobolev inequality and the equivalence of two-sided uniform Ricci curvature bounds to functional inequalities. We also obtain concentration and tail estimates. In the third direction, we study Ricci flow on totally geodesic Riemannian foliations. Under the transverse Ricci flow, we prove two types of differential Harnack inequalities for the positive solutions of the heat equation. We also get a time dependent generalized curvature dimension inequality. As consequences, we get parabolic Harnack inequalities and heat kernel upper bounds.
Author: Laurent Decreusefond Publisher: Springer Science & Business Media ISBN: 9780817642006 Category : Mathematics Languages : en Pages : 266
Book Description
One of the most challenging subjects of stochastic analysis in relation to physics is the analysis of heat kernels on infinite dimensional manifolds. The simplest nontrivial case is that of thepath and loop space on a Lie group. In this volume an up-to-date survey of the topic is given by Leonard Gross, a prominent developer of the theory. Another concise but complete survey of Hausdorff measures on Wiener space and its applications to Malliavin Calculus is given by D. Feyel, one of the most active specialists in this area. Other survey articles deal with short-time asymptotics of diffusion pro cesses with values in infinite dimensional manifolds and large deviations of diffusions with discontinuous drifts. A thorough survey is given of stochas tic integration with respect to the fractional Brownian motion, as well as Stokes' formula for the Brownian sheet, and a new version of the log Sobolev inequality on the Wiener space. Professional mathematicians looking for an overview of the state-of-the art in the above subjects will find this book helpful. In addition, graduate students as well as researchers whose domain requires stochastic analysis will find the original results of interest for their own research. The organizers acknowledge gratefully the financial help ofthe University of Oslo, and the invaluable aid of Professor Bernt 0ksendal and l'Ecole Nationale Superieure des Telecommunications.
Author: Hayri Korezlioglu Publisher: Springer ISBN: 354039186X Category : Mathematics Languages : en Pages : 384
Book Description
The Silvri Workshop was divided into a short summer school and a working conference, producing lectures and research papers on recent developments in stochastic analysis on Wiener space. The topics treated in the lectures relate to the Malliavin calculus, the Skorohod integral and nonlinear functionals of white noise. Most of the research papers are applications of these subjects. This volume addresses researchers and graduate students in stochastic processes and theoretical physics.
Author: Yuri E. Gliklikh Publisher: Springer Science & Business Media ISBN: 0857291637 Category : Mathematics Languages : en Pages : 454
Book Description
Methods of global analysis and stochastic analysis are most often applied in mathematical physics as separate entities, thus forming important directions in the field. However, while combination of the two subject areas is rare, it is fundamental for the consideration of a broader class of problems. This book develops methods of Global Analysis and Stochastic Analysis such that their combination allows one to have a more or less common treatment for areas of mathematical physics that traditionally are considered as divergent and requiring different methods of investigation. Global and Stochastic Analysis with Applications to Mathematical Physics covers branches of mathematics that are currently absent in monograph form. Through the demonstration of new topics of investigation and results, both in traditional and more recent problems, this book offers a fresh perspective on ordinary and stochastic differential equations and inclusions (in particular, given in terms of Nelson's mean derivatives) on linear spaces and manifolds. Topics covered include classical mechanics on non-linear configuration spaces, problems of statistical and quantum physics, and hydrodynamics. A self-contained book that provides a large amount of preliminary material and recent results which will serve to be a useful introduction to the subject and a valuable resource for further research. It will appeal to researchers, graduate and PhD students working in global analysis, stochastic analysis and mathematical physics.
Author: H. Körezlioglu Publisher: Springer Science & Business Media ISBN: 1461203732 Category : Mathematics Languages : en Pages : 372
Book Description
This volume contains a large spectrum of work: super processes, Dirichlet forms, anticipative stochastic calculus, random fields and Wiener space analysis. The first part of the volume consists of two main lectures given at the third Silivri meeting in 1990: 1. "Infinitely divisible random measures and superprocesses" by D.A. Dawson, 2. "Dirichlet forms on infinite dimensional spaces and appli cations" by M. Rockner. The second part consists of recent research papers all related to Stochastic Analysis, motivated by stochastic partial differ ential equations, Markov fields, the Malliavin calculus and the Feynman path integrals. We would herewith like to thank the ENST for its material support for the above mentioned meeting as well as for the ini tial preparation of this volume and to our friend and colleague Erhan Qmlar whose help and encouragement for the realization of this volume have been essential. H. Korezlioglu A.S. Ustiinel INFINITELY DIVISIBLE RANDOM MEASURES AND SUPERPROCESSES DONALD A. DAWSON 1. Introduction.
Author: Ulug Capar Publisher: Birkhäuser ISBN: 3034880200 Category : Mathematics Languages : en Pages : 209
Book Description
Over the last years, stochastic analysis has had an enormous progress with the impetus originating from different branches of mathematics: PDE's and the Malliavin calculus, quantum physics, path space analysis on curved manifolds via probabilistic methods, and more. This volume contains selected contributions which were presented at the 8th Silivri Workshop on Stochastic Analysis and Related Topics, held in September 2000 in Gazimagusa, North Cyprus. The topics include stochastic control theory, generalized functions in a nonlinear setting, tangent spaces of manifold-valued paths with quasi-invariant measures, and applications in game theory, theoretical biology and theoretical physics. Contributors: A.E. Bashirov, A. Bensoussan and J. Frehse, U. Capar and H. Aktuglul, A.B. Cruzeiro and Kai-Nan Xiang, E. Hausenblas, Y. Ishikawa, N. Mahmudov, P. Malliavin and U. Taneri, N. Privault, A.S. stnel.
Author: Jochen Blath Publisher: Cambridge University Press ISBN: 052171821X Category : Mathematics Languages : en Pages : 397
Book Description
Presenting important trends in the field of stochastic analysis, this collection of thirteen articles provides an overview of recent developments and new results. Written by leading experts in the field, the articles cover a wide range of topics, ranging from an alternative set-up of rigorous probability to the sampling of conditioned diffusions. Applications in physics and biology are treated, with discussion of Feynman formulas, intermittency of Anderson models and genetic inference. A large number of the articles are topical surveys of probabilistic tools such as chaining techniques, and of research fields within stochastic analysis, including stochastic dynamics and multifractal analysis. Showcasing the diversity of research activities in the field, this book is essential reading for any student or researcher looking for a guide to modern trends in stochastic analysis and neighbouring fields.
Author: Michel Metivier Publisher: Springer ISBN: 3540392327 Category : Mathematics Languages : en Pages : 206
Book Description
Annotation Contents: G. Benarous: Noyau de la chaleur hypoelliptique et géométrie sous-riemannienne.- M. Fukushima: On two Classes of Smooth Measures for Symmetric Markov Processes.- T. Funaki: The Hydrodynamical Limit for Scalar Ginzburg-Landau Model on R.- N. Ikeda, S. Kusuoka: Short time Asymptotics for Fundamental Solutions of Diffusion Equations.- K. Ito: Malliavin Calculus on a Segal Space.- Y. Kasahara, M. Maejima: Weak Convergence of Functionals of Point Processes on Rd.- Y. Katznelson, P. Malliavin: Image des Points critiques d'une application régulière.- S. Kusuoka: Degree Theorem in Certain Wiener Riemannian Manifolds.- R. Leandre: Applications quantitatives et géométrique du calcul de Malliavin.- Y. Le Jan: On the Fock Space Representation of Occupations Times for non Reversible Markov Processes.- M. Metivier, M. Viot: On Weak Solutions of Stochastic Partial Differential Equations.- P.A. Meyer: Une remarque sur les Chaos de Wiener.- H. Tanaka: Limit Theorem for One-Dimensional Diffusion Process in Brownian Environment.- H. Uemura, S. Watanabe: Diffusion Processes and Heat Kernels on Certain Nilpotent Groups.
Author: Yuliya Mishura Publisher: Springer ISBN: 3540758739 Category : Mathematics Languages : en Pages : 411
Book Description
This volume examines the theory of fractional Brownian motion and other long-memory processes. Interesting topics for PhD students and specialists in probability theory, stochastic analysis and financial mathematics demonstrate the modern level of this field. It proves that the market with stock guided by the mixed model is arbitrage-free without any restriction on the dependence of the components and deduces different forms of the Black-Scholes equation for fractional market.
Author: Qi Feng
Author: Qi Feng
Author: Laurent Decreusefond
Author: Hayri Korezlioglu
Author: Yuri E. Gliklikh
Author: H. Körezlioglu
Author: Ulug Capar
Author: Jochen Blath
Author: H. Korezlioglu
Author: Michel Metivier
Author: Yuliya Mishura