A teia Browniana radial / The Radial Brownian Web

Henao, León Alexander Valencia

29 February 2012

Introduzimos uma familia de trajetorias aleatorias coalescentes com certo tipo de comportamento radial a qual chamaremos de Teia Poissoniana radial discreta. Mostramos que o limite fraco na escala difusiva desta familia e uma familia de trajetorias aleatorias coalescentes que chamaremos de Teia Browniana radial. Por m, caraterizamos o objeto limite como um mapeamento continuo da Teia Browniana restrita num subconjunto de R2. / We introduce a family of coalescing random paths with certain kind of radial behavior. We call them the discrete radial Poisson Web. We show that under diusive scaling this family converges in distribution to a family of coalescing random paths which we call radial Brownian Web. Finally, we characterize the limiting object as a continuous mapping of the Brownian Web restricted to a subset of R2.

Brownian Web

convergência fraca.

limite de escala

scaling limit

Teia Browniana

weak convergence.

A teia Browniana radial / The Radial Brownian Web

León Alexander Valencia Henao

29 February 2012

Introduzimos uma familia de trajetorias aleatorias coalescentes com certo tipo de comportamento radial a qual chamaremos de Teia Poissoniana radial discreta. Mostramos que o limite fraco na escala difusiva desta familia e uma familia de trajetorias aleatorias coalescentes que chamaremos de Teia Browniana radial. Por m, caraterizamos o objeto limite como um mapeamento continuo da Teia Browniana restrita num subconjunto de R2. / We introduce a family of coalescing random paths with certain kind of radial behavior. We call them the discrete radial Poisson Web. We show that under diusive scaling this family converges in distribution to a family of coalescing random paths which we call radial Brownian Web. Finally, we characterize the limiting object as a continuous mapping of the Brownian Web restricted to a subset of R2.

convergência fraca.

limite de escala

Teia Browniana

Brownian Web

scaling limit

weak convergence.

Processus auto-interagissants et grandes déviations / Self-interacting processes and large deviations

Dumaz, Laure

07 December 2012

Cette thèse porte sur divers aspects de lois et de processus non-gaussiens qui partagent des propriétés de changement d'échelle où intervient l'exposant 2/3. Les deux principaux objets probabilistes que nous allons présenter sont : 1) La loi de Tracy-Widom : C'est la loi limite de la plus grande valeur propre de matrices aléatoires appartenant aux beta-ensembles lorsque leur dimension tend vers l'infini. Dans un travail en commun avec Balint Virag, nous avons établi le comportement asymptotique de la queue droite de cette loi pour tout beta strictement positif, en utilisant des outils d'analyse de diffusions du type Girsanov. 2) Le ''vrai'' processus auto-répulsif (''true self repelling motion'') TSRM : C'est un processus auto-interagissant qui a été introduit par Balint Toth et Wendelin Werner. Nous nous sommes intéressés à des propriétés de cet objet liées à ses trajectoires (grandes déviations, lois du logarithme itéré) et à des calculs explicites de lois marginales (travail en collaboration avec Balint Toth). Cette étude nous a aussi amenés à aborder des questions liées à la théorie des jeux. / This thesis focuses on various aspects of non-Gaussian distributions and processes sharing scaling properties where the exponent 2/3 appears. The two probabilistic objects that we will introduce are: 1) Tracy-Widom distribution: This is the large dimensional limit of the top eigenvalue of random matrices in beta-ensembles. In a joint work with Balint Virag, we studied the asymptotic behavior of its right tail for all positive beta, using tools coming from diffusion analysis, such as the Girsanov formula. 2) The “true self repelling motion” (TSRM): This is a self-interacting process which was introduced by Balint Toth and Wendelin Werner. We have been interested in properties related to trajectories of this motion (large deviations, law of the iterated logarithm) and explicit distribution computations (joint work with Balint Toth). During this study, we have also dealt with questions related to game theory.

Processus auto-interagissants

Vrai processus auto-répulsif

Toile brownienne

Grandes déviations

Loi de Tracy-Widom

Self-interacting processes

True self repelling motion

Brownian Web

Large deviations

Tracy-Widom law