In this paper, a finite-horizon optimal control problem involving a dynamical system described by a linear Caputo fractional differential equation and a quadratic cost functional is considered. An explicit formula for the value functional is given, which includes a solution of a certain Fredholm integral equation. A step-by-step feedback control procedure for constructing $\varepsilon$-optimal controls with any accuracy $\varepsilon > 0$ is proposed. The basis for obtaining these results is the study of a solution of the associated Hamilton-Jacobi-Bellman equation with so-called fractional coinvariant derivatives.
Sensitivity analysis of value functional of fractional optimal control problem with application to construction of optimal feedback control
A Linear-Quadratic Optimal Control Problem for Mean-Field Stochastic Differential Equations
An optimal feedback control that minimizes the epidemic peak in the SIR model under a budget constraint
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