A sufficient condition for a hypersurface to be isoparametric

Abstract

Let Mn be a closed Riemannian manifold on which the integral of the scalar curvature is nonnegative. Suppose a is a symmetric (0,2) tensor field whose dual (1,1) tensor A has n distinct eigenvalues, and tr(Ak) are constants for k=1,·s, n-1. We show that all the eigenvalues of A are constants, generalizing a theorem of de Almeida and Brito dB90 to higher dimensions. As a consequence, a closed hypersurface Mn in Sn+1 is isoparametric if one takes a above to be the second fundamental form, giving affirmative evidence to Chern's conjecture.