Upper bound estimation for the ratio of the first two eigenvalues of Robin Laplacian
Authors
Guowei Dai
Yingxin Sun
Abstract
The celebrated conjecture by Payne, Pólya and Weinberger (1956) states that for the fixed membrane problem, the ratio of the first two eigenvalues, $λ_2/λ_1$, is maximized by a disk. A more general dimensional version of this conjecture was later resolved by Ashbaugh and Benguria in the 1990s. For the Robin Laplacian, Payne and Schaefer (2001) formulated an analogous conjecture, positing that the ratio $μ_2/μ_1$ is also maximized by a disk for a range of the boundary parameter $σ$. This was later restated by Henrot in 2003. In this work, under some suitable conditions, we affirm this conjecture for all dimensions $N\geq2$ and for all $σ>0$. Furthermore, we prove that the maximum value of $μ_2/μ_1$ is strictly decreasing in $σ$ over the entire interval $(0,+\infty)$. Our result provides a positive answer to a variant of Yau's Problem 77: by measuring the ratio of the first two eigenfrequencies, one can determine whether an elastically supported drum is circular.
