Problems for generalized Monge-Ampère equations

Pub Date : 2023-09-11 DOI:10.4153/s0008439523000656
Cristian Enache, Giovanni Porru
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Abstract

Abstract This paper deals with some Monge–Ampère type equations involving the gradient that are elliptic in the framework of convex functions. First, we show that such equations may be obtained by minimizing a suitable functional. Moreover, we investigate a P-function associated with the solution to a boundary value problem of our generalized Monge–Ampère equation in a bounded convex domain. It will be shown that this P-function attains its maximum value on the boundary of the underlying domain. Furthermore, we show that such a P-function is actually identically constant when the underlying domain is a ball. Therefore, our result provides a best possible maximum principles in the sense of L. E. Payne. Finally, in case of dimension 2, we prove that this P-function also attains its minimum value on the boundary of the underlying domain. As an application, we will show that the solvability of a Serrin’s type overdetermined problem for our generalized Monge–Ampère type equation forces the underlying domain to be a ball.
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广义monge - ampantere方程问题
在凸函数的框架下,研究了一类椭圆型的含有梯度的monge - ampantere型方程。首先,我们证明这样的方程可以通过最小化一个合适的泛函得到。此外,我们研究了与有界凸域上广义monge - amp方程边值问题解相关的p函数。结果表明,该p函数在基础域的边界处达到最大值。进一步,我们证明了当基础域是球时,这样的p函数实际上是相同常数。因此,我们的结果提供了L. E. Payne意义上的最佳可能最大值原则。最后,在维数为2的情况下,我们证明了该p函数在基础域的边界上也达到了最小值。作为一个应用,我们将证明Serrin型超定问题对于我们的广义monge - ampantere型方程的可解性迫使底层区域是一个球。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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