Add to ORKGWe introduce a new variational principle for the study of eigenvalues and eigenfunctions of the Laplacians with Neumann and Dirichlet boundary conditions on planar domains. In contrast to the classical variational principles, its minimizers are gradients of eigenfunctions instead of the eigenfunctions themselves. This variational principle enables us to give an elementary analytic proof of the famous hot spots conjecture for the class of so-called lip domains. More specifically, we show that each eigenfunction corresponding to the lowest positive eigenvalue of the Neumann Laplacian on such a domain is strictly monotonous along two mutually orthogonal directions. In particular, its maximum and minimum may only be located on the boundary.Comm...
to appear in Topological Methods in Nonlinear AnalysisInternational audienceWe investigate multiplic...
We prove the Pleijel theorem in non-collapsed RCD spaces, providing an asymptotic upper bound on the...
AbstractWe study the lowest eigenvalue λ1(ε) of the Laplacian -Δ in a bounded domain Ω⊂Rd, d⩾2, from...
We construct a counterexample to the "hot spots" conjecture; there exists a bounded connected plana...
Consider a convex planar domain with two axes of symmetry. We show that the maximum and minimum of a...
Abstract. The “hot spots conjecture ” of Jeffrey Rauch says that the second Neumann eigenfunction fo...
We investigate eigenfunctions of the Neumann Laplacian in a bounded domain Omega subset of Rd, where...
We prove the “hot spots” conjecture on the Vicsek set. Specifically, we will show that every eigenfu...
We describe a shape derivative approach to provide a candidate for an optimal domain among non-simpl...
Abstract. We prove the “hot spots ” conjecture of J. Rauch in the case that the domain Ω is a planar...
In this lecture, we begin examining a generalized look at the Laplacian Eigenvalue Problem, particul...
We present asymptotically sharp inequalities for the eigenvalues mu(k) of the Laplacian on a domain ...
AbstractWe construct a set in RD with the property that the nodal surface of the second eigenfunctio...
Hot-spots conjecture, posed by J. Rauch, states that the hottest point on an insulated plate with ar...
International audienceA. Pleijel (1956) has proved that in the case of the Laplacian with Dirichlet ...
to appear in Topological Methods in Nonlinear AnalysisInternational audienceWe investigate multiplic...
We prove the Pleijel theorem in non-collapsed RCD spaces, providing an asymptotic upper bound on the...
AbstractWe study the lowest eigenvalue λ1(ε) of the Laplacian -Δ in a bounded domain Ω⊂Rd, d⩾2, from...
We construct a counterexample to the "hot spots" conjecture; there exists a bounded connected plana...
Consider a convex planar domain with two axes of symmetry. We show that the maximum and minimum of a...
Abstract. The “hot spots conjecture ” of Jeffrey Rauch says that the second Neumann eigenfunction fo...
We investigate eigenfunctions of the Neumann Laplacian in a bounded domain Omega subset of Rd, where...
We prove the “hot spots” conjecture on the Vicsek set. Specifically, we will show that every eigenfu...
We describe a shape derivative approach to provide a candidate for an optimal domain among non-simpl...
Abstract. We prove the “hot spots ” conjecture of J. Rauch in the case that the domain Ω is a planar...
In this lecture, we begin examining a generalized look at the Laplacian Eigenvalue Problem, particul...
We present asymptotically sharp inequalities for the eigenvalues mu(k) of the Laplacian on a domain ...
AbstractWe construct a set in RD with the property that the nodal surface of the second eigenfunctio...
Hot-spots conjecture, posed by J. Rauch, states that the hottest point on an insulated plate with ar...
International audienceA. Pleijel (1956) has proved that in the case of the Laplacian with Dirichlet ...
to appear in Topological Methods in Nonlinear AnalysisInternational audienceWe investigate multiplic...
We prove the Pleijel theorem in non-collapsed RCD spaces, providing an asymptotic upper bound on the...
AbstractWe study the lowest eigenvalue λ1(ε) of the Laplacian -Δ in a bounded domain Ω⊂Rd, d⩾2, from...