Roméo Leylekian
Published 2023-06-27Version 1
In 1995, Nadirashvili and subsequently Ashbaugh and Benguria proved the Rayleigh Conjecture concerning the first eigenvalue of the bilaplacian with clamped boundary conditions in dimension $2$ and $3$. Since then, the conjecture has remained open in dimension $d>3$. In this document, we contribute in answering the conjecture under a particular assumption regarding the critical values of the optimal eigenfunction. More precisely, we prove that if the optimal eigenfunction has no critical value except its minimum and maximum, then the conjecture holds. This is performed thanks to an improvement of Talenti's comparison principle, made possible after a fine study of the geometry of the eigenfunction's nodal domains.
Comments: 28 pages, 3 figures
Sufficient conditions yielding the Rayleigh Conjecture for the clamped plate
Existence of an optimal domain for minimizing the fundamental tone of a clamped plate of prescribed volume in arbitrary dimension
Minimization of the buckling load of a clamped plate with perimeter constraint
![QR code for arXiv:2306.15523 [math.AP]](http://oss.arxitics.com/images/favicon.svg)