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On dynamical reconstruction of boundary and distributed inputs in a Schlögl equation. (English) Zbl 1433.49054

Summary: The problem of reconstructing an unknown input under measuring a phase coordinates of a Schlögl equation is considered. We propose a solving algorithm that is stable to perturbations and is based on the combination of ideas from the theory of dynamical inversion and the theory of guaranteed control. The convergence rate of the algorithm is obtained.

MSC:

49N45 Inverse problems in optimal control
93B52 Feedback control
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