Ítem
Acceso Abierto
On the LP formulation in measure spaces of optimal control problems for jump-diffusions
Título de la revista
Autores
Serrano Perdomo, Rafael Antonio
Archivos
Fecha
2015
Directores
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Editor
Elsevier
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Métricas alternativas
Resumen
Abstract
In this short note we formulate a infinite-horizon stochastic optimal control problem for jump-diffusions of Ito-Levy type as a LP problem in a measure space, and prove that the optimal value functions of both problems coincide. The main tools are the dual formulation of the LP primal problem, which is strongly connected to the notion of sub-solution of the partial integro-differential equation of Hamilton-Jacobi-Bellman type associated with the optimal control problem, and the Krylov regularization method for viscosity solutions. © 2015 Elsevier B.V. All rights reserved.
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Keywords
Differential equations , Diffusion , Integrodifferential equations , Linear programming , Optimal control systems , Stochastic systems , Viscosity , Dual formulations , Jump diffusion , Occupation measure , Stochastic control , Viscosity solutions , Stochastic control systems , Dual formulation , Jump-diffusion , Linear programming , Occupation measure , Stochastic control , Viscosity solution
