On the Quasi-Linear Elliptic PDE -∇·(∇u/1-|∇u|2) = 4πΣk ak δsk in Physics and Geometry

Abstract

It is shown that for each finite number of Dirac measures supported at points sn in three-dimensional Euclidean space, with given amplitudes an, there exists a unique real-valued Lipschitz function u, vanishing at infinity, which distributionally solves the quasi-linear elliptic partial differential equation of divergence form -∇·(∇u/1-|∇u|2)=4πΣn=1N an δsn. Moreover, u is real analytic away from the sn. The result can be interpreted in at least two ways: (a) for any number of point charges of arbitrary magnitude and sign at prescribed locations sn in three-dimensional Euclidean space there exists a unique electrostatic field which satisfies the Maxwell-Born-Infeld field equations smoothly away from the point charges and vanishes as |s|∞; (b) for any number of integral mean curvatures assigned to locations sn there exists a unique asymptotically flat, almost everywhere space-like maximal slice with point defects of Minkowski spacetime, having lightcone singularities over the sn but being smooth otherwise, and whose height function vanishes as |s|∞. No struts between the point singularities ever occur.