On multiplicity of eigenvalues and symmetry of eigenfunctions of the p-Laplacian

Abstract

We investigate multiplicity and symmetry properties of higher eigenvalues and eigenfunctions of the p-Laplacian under homogeneous Dirichlet boundary conditions on certain symmetric domains ⊂ RN. By means of topological arguments, we show how symmetries of help to construct subsets of W01,p() with suitably high Krasnosel'ski genus. In particular, if is a ball B ⊂ RN, we obtain the following chain of inequalities: λ2(p;B) ≤ … ≤ λN+1(p;B) ≤ λ(p;B). Here λi(p;B) are variational eigenvalues of the p-Laplacian on B, and λ(p;B) is the eigenvalue which has an associated eigenfunction whose nodal set is an equatorial section of B. If λ2(p;B)=λ(p;B), as it holds true for p=2, the result implies that the multiplicity of the second eigenvalue is at least N. In the case N=2, we can deduce that any third eigenfunction of the p-Laplacian on a disc is nonradial. The case of other symmetric domains and the limit cases p=1, p=∞ are also considered.