|
|
| |
| On the Payne-Schaefer Conjecture About an Overdetermined Boundary Problem of Sixth Order |
| |
Citation: |
Changyu XIA.On the Payne-Schaefer Conjecture About an Overdetermined Boundary Problem of Sixth Order[J].Chinese Annals of Mathematics B,2026,(1):213~228 |
| Page view: 183
Net amount: 94 |
Authors: |
Changyu XIA; |
|
|
| Abstract: |
This paper considers overdetermined boundary value problems for sixth-order elliptic equations. The author gives a complete proof of the Payne–Schaefer conjecture, which asserts that if a solution to a certain sixth-order equation satisfies two homogeneous boundary conditions on a smooth domain, then the domain must be a ball. The proof relies on integral identities, the Bennett identity, and a moving plane argument. |
Keywords: |
Overdetermined problem Payne-Schaefer conjecture Bennett theorem Euclidean ball |
Classification: |
35N25, 35N30, 35R01 |
|
|
Download PDF Full-Text
|
|
|
|
