Killing vector fields of constant length on compact hypersurfaces
Abstract
We show that if a compact hypersurface M ⊂ Rn+1, n ≥3, admits a non zero Killing vector field X of constant length then n is even and M is diffeomorphic to the unit hypersphere of Rn+1. Actually, we show that M is a complex ellipsoid in CN = Rn+1. As an application we give a simpler proof of a recent theorem due to S. Deshmukh De12.
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