Daniel Andersson
Published 2008-11-30, updated 2008-12-08Version 2
We study singular stochastic control of a two dimensional stochastic differential equation, where the first component is linear with random and unbounded coefficients. We derive existence of an optimal relaxed control and necessary conditions for optimality in the form of a mixed relaxed-singular maximum principle in a global form. A motivating example is given in the form of an optimal investment and consumption problem with transaction costs, where we consider a portfolio with a continuum of bonds and where the portfolio weights are modeled as measure-valued processes on the set of times to maturity.
A maximum principle for relaxed stochastic control of linear SDE's with application to bond portfolio optimization
Dynamic Programming for General Linear Quadratic Optimal Stochastic Control with Random Coefficients
Linear-Quadratic Optimal Control Problem for Mean-Field Stochastic Differential Equations with a Type of Random Coefficients
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