Para Blaschke isoparametric spacelike hypersurfaces in Lorentzian space forms

Abstract

Let Mn be an n-dimensional umbilic-free hypersurface in the (n+1)-dimensional Lorentzian space form Mn+11(c). Three basic invariants of Mn under the conformal transformation group of Mn+11(c) are a 1-form C, called conformal 1-form, a symmetric (0,2) tensor B, called conformal second fundamental form, and a symmetric (0,2) tensor A, called Blaschke tensor. The so-called para-Blaschke tensor Dλ=A+λ B, the linear combination of A and B, is still a symmetric (0,2) tensor. A spacelike hypersurface is called a para-Blaschke isoparametric spacelike hypersurface, if the conform 1-form vanishes and the eigenvalues of the para-Blaschke tensor are constant. In this paper, we classify the para-Blaschke isoparametric spacelike hypersurfaces under the conformal group of Mn+11(c).