Backward SDEs for optimal control of partially observed path-dependent stochastic systems: A control randomization approach

Bandini, Elena; Cosso, Andrea; Fuhrman, Marco; Pham, Huyên

doi:10.1214/17-aap1340

Cited by 28 publications

(62 citation statements)

References 33 publications

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“…Following [2], we next introduce a variant of the optimal switching problem formulated in the new setting (Ω,F,P,Ŵ ). We define a new filtration, denoted FŴ ,∞ = (FŴ ,∞ t ) t≥0 , as follows: we first introduce…”

Section: Preliminariesmentioning

confidence: 99%

“…We follow closely [2], making use in particular of the basic Proposition 4.2 in that paper. Let (Ω, F, P, W ) be a setting for the optimal switching problem formulated in section 2.2.…”

Section: Proof Of the Inequality υmentioning

confidence: 99%

“…It follows that J R (ν) ≤υ ∞ 0 , where the latter was defined in (4.5). From the arbitrariness ofν we deduce that supν ∈V inf > 0 J R (ν) ≤υ In this proof we borrow some constructions from [21] and [2], but the proofs need substantial extensions. This is due to the cost J 2 (α) in (2.9) related to switching: in the various approximations and convergence arguments in Lemmas 4.2, 4.4, 4.5, this term requires a special treatment, in particular because we do not require boundedness of the costs c t (x, a, a ′ ) nor a uniform bound on the number N T of switchings.…”

Section: Proof Of the Inequality υmentioning

confidence: 99%

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Optimal switching problems with an infinite set of modes: An approach by randomization and constrained backward SDEs

Fuhrman

Morlais

2020

Stochastic Processes and their Applications

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We address a general optimal switching problem over finite horizon for a stochastic system described by a differential equation driven by Brownian motion. The main novelty is the fact that we allow for infinitely many modes (or regimes, i.e. the possible values of the piecewiseconstant control process). We allow all the given coefficients in the model to be path-dependent, that is, their value at any time depends on the past trajectory of the controlled system. The main aim is to introduce a suitable (scalar) backward stochastic differential equation (BSDE), with a constraint on the martingale part, that allows to give a probabilistic representation of the value function of the given problem. This is achieved by randomization of control, i.e. by introducing an auxiliary optimization problem which has the same value as the starting optimal switching problem and for which the desired BSDE representation is obtained. In comparison with the existing literature we do not rely on a system of reflected BSDE nor can we use the associated Hamilton-Jacobi-Bellman equation in our non-Markovian framework.

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Section: Preliminariesmentioning

confidence: 99%

“…We follow closely [2], making use in particular of the basic Proposition 4.2 in that paper. Let (Ω, F, P, W ) be a setting for the optimal switching problem formulated in section 2.2.…”

Section: Proof Of the Inequality υmentioning

confidence: 99%

Section: Proof Of the Inequality υmentioning

confidence: 99%

See 1 more Smart Citation

Optimal switching problems with an infinite set of modes: An approach by randomization and constrained backward SDEs

Fuhrman

Morlais

2020

Stochastic Processes and their Applications

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“…Let (Ω, F, P; x 0 , W, π; X; A) be the setting of the original stochastic control problem in Section 3.1. Proceeding along the same lines as at the beginning of Section 4.1 in [1], we construct an atomless finite measure λ ′ 0 on (R, B(R)) and a surjective Borel-measurable map π : R → Λ such that λ 0 = λ ′ 0 • π −1 . Let (Ω ′ , F ′ , P ′ ) be the completion of the canonical probability space of a Poisson random measure…”

Section: Formulation Of the Randomized Control Problemmentioning

confidence: 99%

“…for all 0 ≤ t ≤ T , with (Tν 0 ,ην 0 ) := (0, a 0 ), belongs toĀḠ and (4.23) holds. Finally, concerning the existence of a sequence (Tν n ,ην n ) n≥1 satisfying (i)-(ii)-(iii)-(iv), we do not report the proof of this result as it can be done proceeding along the same lines as in the proof of Lemma 4.3 in [1], the only difference being that the filtration F W in [1] (notice that in [1] W denotes a finite dimensional Brownian motion) is now replaced by F x 0 ,W,π : this does not affect the proof of Lemma 4.3 in [1]. ✷ Remark 4.2 Let (Ω,F ,P;x 0 ,W ,π,θ;Ī,X;V) andḠ be respectively the probabilistic setting for the randomized control problem and the σ-algebra mentioned in Lemma 4.2.…”

Section: Formulation Of the Randomized Control Problemmentioning

confidence: 99%

BSDE representation and randomized dynamic programming principle for stochastic control problems of infinite-dimensional jump-diffusions

Bandini¹,

Confortola²,

Cosso³

2019

Electron. J. Probab.

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We consider a general class of stochastic optimal control problems, where the state process lives in a real separable Hilbert space and is driven by a cylindrical Brownian motion and a Poisson random measure; no special structure is imposed on the coefficients, which are also allowed to be path-dependent; in addition, the diffusion coefficient can be degenerate. For such a class of stochastic control problems, we prove, by means of purely probabilistic techniques based on the so-called randomization method, that the value of the control problem admits a probabilistic representation formula (known as non-linear Feynman-Kac formula) in terms of a suitable backward stochastic differential equation. This probabilistic representation considerably extends current results in the literature on the infinite-dimensional case, and it is also relevant in finite dimension. Such a representation allows to show, in the non-path-dependent (or Markovian) case, that the value function satisfies the so-called randomized dynamic programming principle. As a consequence, we are able to prove that the value function is a viscosity solution of the corresponding Hamilton-Jacobi-Bellman equation, which turns out to be a second-order fully non-linear integro-differential equation in Hilbert space.

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Recurrent neural networks for stochastic control problems with delay

Han

2021

Math. Control Signals Syst.

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Stochastic control problems with delay are challenging due to the path-dependent feature of the system and thus its intrinsic high dimensions. In this paper, we propose and systematically study deep neural network-based algorithms to solve stochastic control problems with delay features. Specifically, we employ neural networks for sequence modeling (e.g., recurrent neural networks such as long short-term memory) to parameterize the policy and optimize the objective function. The proposed algorithms are tested on three benchmark examples: a linear-quadratic problem, optimal consumption with fixed finite delay, and portfolio optimization with complete memory. Particularly, we notice that the architecture of recurrent neural networks naturally captures the path-dependent feature with much flexibility and yields better performance with more efficient and stable training of the network compared to feedforward networks. The superiority is even evident in the case of portfolio optimization with complete memory, which features infinite delay.

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Backward SDEs for optimal control of partially observed path-dependent stochastic systems: A control randomization approach

Cited by 28 publications

References 33 publications

Optimal switching problems with an infinite set of modes: An approach by randomization and constrained backward SDEs

Optimal switching problems with an infinite set of modes: An approach by randomization and constrained backward SDEs

BSDE representation and randomized dynamic programming principle for stochastic control problems of infinite-dimensional jump-diffusions

Recurrent neural networks for stochastic control problems with delay

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