Optimal control of systems with noisy memory and BSDEs with Malliavin derivatives
Journal article, Peer reviewed
Permanent lenke
http://hdl.handle.net/11250/2466169Utgivelsesdato
2016Metadata
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- Articles (FOR) [100]
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Sammendrag
In this article we consider a stochastic optimal control problem where
the dynamics of the state process, X(t), is a controlled stochastic differential
equation with jumps, delay and noisy memory. The term noisy
memory is, to the best of our knowledge, new. By this we mean that the
dynamics of X(t) depend on R t
t−δ X(s)dB(s) (where B(t) is a Brownian
motion). Hence, the dependence is noisy because of the Brownian motion,
and it involves memory due to the influence from the previous values of
the state process.
We derive necessary and sufficient maximum principles for this stochastic
control problem in two different ways, resulting in two sets of maximum
principles. The first set of maximum principles is derived using Malliavin
calculus techniques, while the second set comes from reduction to a discrete
delay optimal control problem, and application of previously known
results by Øksendal, Sulem and Zhang. The maximum principles also
apply to the case where the controller has only partial information, in the
sense that the admissible controls are adapted to a sub-σ-algebra of the
natural filtration.