Locally Lipschitz stability of solutions to a parametric parabolic optimal control problem with mixed pointwise constraints
Người báo cáo: Huỳnh Khanh
Thời gian: 9am-11am sáng Thứ Ba ngày 16/01/2024
Địa điểm: Phòng 612, nhà A6
Tóm tắt: A class of parametric optimal control problems governed by semilinear parabolic equations with mixed pointwise constraints is investigated in this paper. The perturbations may appear in both the objective functional, in the state equation and in mixed pointwise constraints. By analyzing regularity and establishing the stability condition of Lagrange multipliers we prove that, if the strictly second-order sufficient condition for the unperturbed problem is valid, then the solutions of the problems as well as the associated Lagrange multipliers are Lipschitz continuous functions of the parameter.
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16/06/26, Hội nghị, hội thảo:
International Conference “Complex Hyperbolicity, Function fields and Non-archimedean Arithmetic"
13/10/26, Hội nghị, hội thảo:
International Workshop on Optimization, Variational Analysis, and Control Theory
09/11/26, Hội nghị, hội thảo:
Workshop on singularities and related topics (Conference in memory of Professor Lê Dũng Tráng)
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