Your search keyword '"60H05, 60H20, 60J75, 93E20, 91G80, 91B70"' showing total 3 results

1. Mean-field stochastic control with elephant memory in finite and infinite time horizon

Author

Nacira Agram and Bernt Øksendal

Subjects

Statistics and Probability, Stochastic control, MathematicsofComputing_NUMERICALANALYSIS, Time horizon, Sense (electronics), Stochastic differential equation, Mean field theory, Optimization and Control (math.OC), Modeling and Simulation, FOS: Mathematics, 60H05, 60H20, 60J75, 93E20, 91G80, 91B70, Applied mathematics, Mathematics - Optimization and Control, Mathematics

Abstract

Our purpose of this paper is to study stochastic control problem for systems driven by mean-field stochastic differential equations with elephant memory, in the sense that the system (like the elephants) never forgets its history. We study both the finite horizon case and the infinite time horizon case. - In the finite horizon case, results about existence and uniqueness of solutions of such a system are given. Moreover, we prove sufficient as well as necessary stochastic maximum principles for the optimal control of such systems. We apply our results to solve a mean-field linear quadratic control problem. - For infinite horizon, we derive sufficient and necessary maximum principles. As an illustration, we solve an optimal consumption problem from a cash flow modelled by an elephant memory mean-field system.

Published

2019

2. New approach to optimal control of stochastic Volterra integral equations

Author

Samia Yakhlef, Bernt Øksendal, and Nacira Agram

Subjects

Statistics and Probability, Mathematics::Number Theory, 010102 general mathematics, Optimal control, 01 natural sciences, Volterra integral equation, 010104 statistics & probability, symbols.namesake, Optimization and Control (math.OC), Modeling and Simulation, symbols, FOS: Mathematics, 60H05, 60H20, 60J75, 93E20, 91G80, 91B70, Applied mathematics, 0101 mathematics, Mathematics - Optimization and Control, Mathematics

Abstract

We study optimal control of stochastic Volterra integral equations (SVIE) with jumps by using Hida-Malliavin calculus. - We give conditions under which there exists unique solutions of such equations. - Then we prove both a sufficient maximum principle (a verification theorem) and a necessary maximum principle via Hida-Malliavin calculus. - As an application we solve a problem of optimal consumption from a cash flow modelled by an SVIE.

Published

2017

3. A Hida-Malliavin white noise calculus approach to optimal control

Author

Bernt Øksendal and Nacira Agram

Subjects

Statistics and Probability, Stochastic control, 021103 operations research, Applied Mathematics, 0211 other engineering and technologies, Statistical and Nonlinear Physics, 010103 numerical & computational mathematics, 02 engineering and technology, White noise, Mathematical proof, Optimal control, 01 natural sciences, Maximum principle, Optimization and Control (math.OC), Calculus, FOS: Mathematics, 60H05, 60H20, 60J75, 93E20, 91G80, 91B70, 0101 mathematics, Mathematics - Optimization and Control, Mathematical Physics, Hamiltonian (control theory), Mathematics

Abstract

The classical maximum principle for optimal stochastic control states that if a control [Formula: see text] is optimal, then the corresponding Hamiltonian has a maximum at [Formula: see text]. The first proofs for this result assumed that the control did not enter the diffusion coefficient. Moreover, it was assumed that there were no jumps in the system. Subsequently, it was discovered by Shige Peng (still assuming no jumps) that one could also allow the diffusion coefficient to depend on the control, provided that the corresponding adjoint backward stochastic differential equation (BSDE) for the first-order derivative was extended to include an extra BSDE for the second-order derivatives. In this paper, we present an alternative approach based on Hida–Malliavin calculus and white noise theory. This enables us to handle the general case with jumps, allowing both the diffusion coefficient and the jump coefficient to depend on the control, and we do not need the extra BSDE with second-order derivatives. The result is illustrated by an example of a constrained linear-quadratic optimal control.

Published

2017