How to smooth a crinkled map of spacetime: Uhlenbeck compactness for L∞ connections and optimal regularity for general relativistic shock waves by the Reintjes-Temple-equations

Abstract

We present authors' new theory of the RT-equations, nonlinear elliptic partial differential equations which determine the coordinate transformations which smooth connections to optimal regularity, one derivative smoother than the Riemann curvature tensor Riem(). As one application we extend Uhlenbeck compactness from Riemannian to Lorentzian geometry; and as another application we establish that regularity singularities at GR shock waves can always be removed by coordinate transformation. This is based on establishing a general multi-dimensional existence theory for the RT-equations, by application of elliptic regularity theory in Lp spaces. The theory and results announced in this paper apply to arbitrary L∞ connections on the tangent bundle TM of arbitrary manifolds M, including Lorentzian manifolds of General Relativity.