Yonghong Wu scite author profile

In this paper, we consider a challenging optimal control problem in which the terminal time is determined by a stopping criterion. This stopping criterion is defined by a smooth surface in the state space; when the state trajectory hits this surface, the governing dynamic system stops. By restricting the controls to piecewise constant functions, we derive a finite-dimensional approximation of the optimal control problem. We then develop an efficient computational method, based on nonlinear programming, for solving the approximate problem. We conclude the paper with four numerical examples.

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A new car-following model accounting for varying road condition

Tang

et al. 2012

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The eigenvalue for a class of singular p-Laplacian fractional differential equations involving the Riemann–Stieltjes integral boundary condition

Zhang

Liu

Wiwatanapataphee

et al. 2014

Applied Mathematics and Computation

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The iterative solutions of nonlinear fractional differential equations

Zhang

Liu

et al. 2013

Applied Mathematics and Computation

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Yonghong Wu

Multiple positive solutions of a singular fractional differential equation with negatively perturbed term

Positive solutions for a nonlocal fractional differential equation

Positive solutions to singular fractional differential system with coupled boundary conditions

The eigenvalue problem for a singular higher order fractional differential equation involving fractional derivatives

Optimal control computation for nonlinear systems with state-dependent stopping criteria

A new car-following model accounting for varying road condition

The eigenvalue for a class of singular p-Laplacian fractional differential equations involving the Riemann–Stieltjes integral boundary condition

The iterative solutions of nonlinear fractional differential equations

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