Zero dynamics boundary control for regulation of the Kuramoto–Sivashinsky equation

In this paper, the quintic B-spline collocation scheme is implemented to find numerical solution of the Kuramoto-Sivashinsky equation. The scheme is based on the Crank-Nicolson formulation for time integration and quintic B-spline functions for space integration. The accuracy of the proposed method

An algorithm for the approximate determination of boundary controls in controhability problems for the wave equation is presented. The algorithm and its variants apply in any number of space dimensions. Furthermore, the algorithm can be used in connection with more general controllability problems i

## Abstract A new numerical method is developed for the boundary optimal control problems of the heat conduction equation in the present paper. When the boundary optimal control problem is solved by minimizing the objective function employing a conjugate‐gradient method, the most crucial step is th