The differentiablity of horizons along their generators

Abstract

Let H be a (past directed) horizon in a time-oriented Lorentz manifold and γ:[( α,β) → H a past directed generator of the horizon, where [( α,β) is [α,β) or ( α,β) . It is proved that either at every point of γ( t) ,~t∈( α,β) the differentiability order of H is the same, or there is a so-called differentiability jumping point γ( t0) ,~t0∈( α,β) such that H is only differentiable at every point γ( t) ,~t∈( α,t0) but not of class C1 and H is exactly of class C1 at every point γ( t) ,~t∈( t0,β) . We will use in the proof a result which shows, that every mathematical horizon in the sense of P. T. Chru\'sciel locally coincides with a Cauchy horizon.