一类椭圆型方程解边值的存在性

Mathematics of The Ussr-sbornik Pub Date : 1992-02-28 DOI:10.1070/SM1992V073N01ABEH002540

A. Gushchin, V. P. Mikhaĭlov

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引用次数: 37

摘要

建立了椭圆型二阶方程解的边值存在性的一个检验。由此证明了该解对所有变量都具有类似于连续的性质()，并且它的边值是解在一大类曲面上(这些曲面不一定与边界“平行”)的迹的极限。

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ON THE EXISTENCE OF BOUNDARY VALUES OF SOLUTIONS OF AN ELLIPTIC EQUATION

A test is established for the existence of a boundary value for the solution of the elliptic second order equation In this connection, it is proved that the solution has a property () similar to continuity with respect to all variables in , and that its boundary value is the limit in of the traces of the solution on surfaces in a large class (which are not necessarily "parallel" to the boundary).

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Mathematics of The Ussr-sbornik

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