Isoparametric foliations and critical sets of eigenfunctions

Abstract

Jakobson and Nadirashvili JN constructed a sequence of eigenfunctions on T2 with a bounded number of critical points, answering in the negative the question raised by Yau Yau1 which asks that whether the number of the critical points of eigenfunctions for the Laplacian increases with the corresponding eigenvalues. The present paper finds three interesting eigenfunctions on the minimal isoparametric hypersurface Mn in Sn+1(1). The corresponding eigenvalues are n, 2n and 3n, while their critical sets consist of 8 points, a submanifold(infinite many points) and 8 points, respectively. On one of its focal submanifolds, a similar phenomenon occurs.