A sharp gradient estimate and W2,q regularity for the prescribed mean curvature equation in the Lorentz-Minkowski space

Abstract

We consider the prescribed mean curvature equation for entire spacelike hypersurfaces in the Lorentz-Minkowski space, namely equation* -div(∇ u1-|∇ u|2)= in RN, equation* where N≥ 3. We first prove a new gradient estimate for classical solutions with smooth data . As a consequence we obtain that the unique weak solution of the equation satisfying a homogeneous boundary condition at infinity is locally of class W2,q and strictly spacelike in RN, provided that ∈ Lq(RN) Lm(RN) with q>N and m∈[1,2NN+2].

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