Ergodicity, Stabilization, and Singular Perturbations for Bellman-Isaacs Equations
Olivier Alvarez · Martino Bardi
xan. de 2010 · American Mathematical Soc.
Libro electrónico
77
Páxinas
reportAs valoracións e as recensións non están verificadas Máis información
Acerca deste libro electrónico
The authors study singular perturbations of optimal stochastic control problems and differential games arising in the dimension reduction of system with multiple time scales. They analyze the uniform convergence of the value functions via the associated Hamilton-Jacobi-Bellman-Isaacs equations, in the framework of viscosity solutions. The crucial properties of ergodicity and stabilization to a constant that the Hamiltonian must possess are formulated as differential games with ergodic cost criteria. They are studied under various different assumptions and with PDE as well as control-theoretic methods. The authors also construct an explicit example where the convergence is not uniform. Finally they give some applications to the periodic homogenization of Hamilton-Jacobi equations with non-coercive Hamiltonian and of some degenerate parabolic PDEs. Table of Contents: Introduction and statement of the problem; Abstract ergodicity, stabilization, and convergence; Uncontrolled fast variables and averaging; Uniformly nondegenerate fast diffusion; Hypoelliptic diffusion of the fast variables; Controllable fast variables; Nonresonant fast variables; A counterexample to uniform convergence; Applications to homogenization; Bibliography. (MEMO/204/960)
Valora este libro electrónico
Dános a túa opinión.
Información de lectura
Smartphones e tabletas
Instala a aplicación Google Play Libros para Android e iPad/iPhone. Sincronízase automaticamente coa túa conta e permíteche ler contido en liña ou sen conexión desde calquera lugar.
Portátiles e ordenadores de escritorio
Podes escoitar os audiolibros comprados en Google Play a través do navegador web do ordenador.
Lectores de libros electrónicos e outros dispositivos
Para ler contido en dispositivos de tinta electrónica, como os lectores de libros electrónicos Kobo, é necesario descargar un ficheiro e transferilo ao dispositivo. Sigue as instrucións detalladas do Centro de Axuda para transferir ficheiros a lectores electrónicos admitidos.
