On the electrostatic Born-Infeld equation with extended charges

Abstract

In this paper, we deal with the electrostatic Born-Infeld equation equationeq:BI-abs BI \ arrayll -div(∇ φ1-|∇ φ|2)= , & in RN, \\ |x| ∞φ(x)= 0, array . equation where is an assigned extended charge density. We are interested in the existence and uniqueness of the potential φ and finiteness of the energy of the electrostatic field -∇ φ. We first relax the problem and treat it with the direct method of the Calculus of Variations for a broad class of charge densities. Assuming is radially distributed, we recover the weak formulation of eq:BI-abs and the regularity of the solution of the Poisson equation (under the same smootheness assumptions). In the case of a locally bounded charge, we also recover the weak formulation without assuming any symmetry. The solution is even classical if is smooth. Then we analyze the case where the density is a superposition of point charges and discuss the results in [Kiessling, Comm. Math. Phys. 314 (2012), 509--523]. Other models are discussed, as for instance a system arising from the coupling of the nonlinear Klein-Gordon equation with the Born-Infeld theory.