Ecole d'Eté de Probabilités 2004 SaintFlour
Overview
Works:  2 works in 2 publications in 1 language and 12 library holdings 

Genres:  Conference papers and proceedings 
Classifications:  QA3, 530.13 
Publication Timeline
.
Most widely held works by
Ecole d'Eté de Probabilités
Differential equations driven by rough paths : École d'été de probabilités de SaintFlour XXXIV2004 by
T. J Lyons(
)
1 edition published in 2007 in English and held by 7 WorldCat member libraries worldwide
"Each year young mathematicians congregate in Saint Flour, France, and listen to extended lecture courses on new topics in Probability Theory. The goal of these notes, representing a course given by Terry Lyons in 2004, is to provide a straightforward and self supporting but minimalist account of the key results forming the foundation of the theory of rough paths. The proofs are similar to those in the existing literature, but have been refined with the benefit of hindsight. The theory of rough paths aims to create the appropriate mathematical framework for expressing the relationships between evolving systems, by extending classical calculus to the natural models for noisy evolving systems, which are often far from differentiable."  Font no determinada
1 edition published in 2007 in English and held by 7 WorldCat member libraries worldwide
"Each year young mathematicians congregate in Saint Flour, France, and listen to extended lecture courses on new topics in Probability Theory. The goal of these notes, representing a course given by Terry Lyons in 2004, is to provide a straightforward and self supporting but minimalist account of the key results forming the foundation of the theory of rough paths. The proofs are similar to those in the existing literature, but have been refined with the benefit of hindsight. The theory of rough paths aims to create the appropriate mathematical framework for expressing the relationships between evolving systems, by extending classical calculus to the natural models for noisy evolving systems, which are often far from differentiable."  Font no determinada
The lace expansion and its applications : Ecole d'Eté de Probabilités de SaintFlour XXXIV2004 by
G Slade(
)
1 edition published in 2006 in English and held by 5 WorldCat member libraries worldwide
The lace expansion is a powerful and flexible method for understanding the critical scaling of several models of interest in probability, statistical mechanics, and combinatorics, above their upper critical dimensions. These models include the selfavoiding walk, lattice trees and lattice animals, percolation, oriented percolation, and the contact process. This volume provides a unified and extensive overview of the lace expansion and its applications to these models. Results include proofs of existence of critical exponents and construction of scaling limits. Often, the scaling limit is described in terms of superBrownian motion
1 edition published in 2006 in English and held by 5 WorldCat member libraries worldwide
The lace expansion is a powerful and flexible method for understanding the critical scaling of several models of interest in probability, statistical mechanics, and combinatorics, above their upper critical dimensions. These models include the selfavoiding walk, lattice trees and lattice animals, percolation, oriented percolation, and the contact process. This volume provides a unified and extensive overview of the lace expansion and its applications to these models. Results include proofs of existence of critical exponents and construction of scaling limits. Often, the scaling limit is described in terms of superBrownian motion
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Associated Subjects
Combinatorial analysis Differential equations Distribution (Probability theory) Mathematical physics Mathematical statistics Mathematics Percolation (Statistical physics) Probabilities Random walks (Mathematics) Scaling laws (Statistical physics) Selfavoiding walks (Mathematics) Stochastic processes
Alternative Names
École d'été de calcul des probabilités de SaintFlour.
Probability Summer School 34 2004 SaintFlour
Probability Summer School in Saint Flour.
SaintFlour Summer School of Probability Theory.
SaintFlour Summer School of Probability Theory 34 2004 SaintFlour
Summer School of Probability Theory 34 2004 SaintFlour
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