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引用次数: 0
摘要
在其中一个唯一性条件下,将哈纳克第一定理推广到方程(1)的解。在本文中,我们考虑函数f(x, u, p)不一定具有上述性质的情况,并且由于哈纳克关于椭圆型微分方程解的第一定理实际上是基于解对边界数据的连续依赖,因此我们在这里处理这种依赖。关于本论文中使用的符号,授予上述引用的论文。
A remark on the generalization of Harnack's first theorem
and under one of those uniqueness conditions, Harnack's first theorem was extended to the solution of the equation (1. 1). It was the case where the function f(x, u, p) was non-decreasing with respect to u. In the present paper, we consider the case where the function f(x, u, p) has not necessarily the above-mentioned property, and since Harnack's first theorem for solutions of the elliptic differential equation is really based on the continuous dependence of solutions upon the boundary data, we will here treat of this dependence. Regarding the notations used in the present paper, confer the above-cited papers.
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