A Green's function for the source-free Maxwell equations on AdS5 × S2 × S3

Abstract

We compute a Green's function giving rise to the solution of the Cauchy problem for the source-free Maxwell's equations on a causal domain D contained in a geodesically normal domain of the Lorentzian manifold AdS5 × S2 × S3, where AdS5 denotes the simply connected 5-dimensional anti-de-Sitter space-time. Our approach is to formulate the original Cauchy problem as an equivalent Cauchy problem for the Hodge Laplacian on D and to seek a solution in the form of a Fourier expansion in terms of the eigenforms of the Hodge Laplacian on S3. This gives rise to a sequence of inhomogeneous Cauchy problems governing the form-valued Fourier coefficients corresponding to the Fourier modes and involving operators related to the Hodge Laplacian on AdS5 × S2, which we solve explicitly by using Riesz distributions and the method of spherical means for differential forms. Finally we put together into the Fourier expansion on S3 the modes obtained by this procedure, producing a 2-form on D⊂ AdS5 × S2 × S3 which we show to be a solution of the original Cauchy problem for Maxwell's equations.