An adaptive least‐squares collocation radial basis function method for the HJB equation

An adaptive least‐squares collocation radial basis function method for the HJB equation

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Article ID: iaor2012612
Volume: 52
Issue: 2
Start Page Number: 305
End Page Number: 322
Publication Date: Feb 2012
Journal: Journal of Global Optimization
Authors: , , ,
Keywords: optimization, numerical analysis
Abstract:

We present a novel numerical method for the Hamilton–Jacobi–Bellman equation governing a class of optimal feedback control problems. The spatial discretization is based on a least‐squares collocation Radial Basis Function method and the time discretization is the backward Euler finite difference. A stability analysis is performed for the discretization method. An adaptive algorithm is proposed so that at each time step, the approximate solution can be constructed recursively and optimally. Numerical results are presented to demonstrate the efficiency and accuracy of the method.

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