一类抛物型方程的非局部边界条件问题

Mathematics of The Ussr-sbornik Pub Date : 1993-02-28 DOI:10.1070/SM1993V074N01ABEH003345

L. A. Muravei, A. V. Filinovskii

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引用次数: 16

摘要

在适当的能量空间中证明了具有非局部边界条件的一维抛物型方程边值问题的适定可解性;得到了解的双面均匀估计，取代了极大值原理。在一类有界变分函数中，建立了质量泛函最小化问题中扩散系数最优控制的存在性。

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ON A PROBLEM WITH NONLOCAL BOUNDARY CONDITION FOR A PARABOLIC EQUATION

Well-posed solvability is proved in an appropriate energy space of a boundary value problem with a nonlocal boundary condition for a one-dimensional parabolic equation; two-sided uniform estimates of the solution are obtained, which replace the maximum principle. The existence of an optimal control of the diffusion coefficient in the problem of minimizing the quality functional is established in the class of functions of bounded variation.

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Mathematics of The Ussr-sbornik

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