Helmholtz's theorem for two retarded fields and its application to Maxwell's equations

Abstract

An extension of the Helmholtz theorem is proved, which states that two retarded vector fields F1 and F2 satisfying appropriate initial and boundary conditions are uniquely determined by specifying their divergences ∇· F1 and ∇· F2 and their coupled curls -∇× F1-∂ F2/∂ t and ∇× F2-(1/c2)∂ F1/∂ t, where c is the propagation speed of the fields. When a corollary of this theorem is applied to Maxwell's equations, the retarded electric and magnetic fields are directly obtained. The proof of the theorem relies on a novel demonstration of the uniqueness of the solutions of the vector wave equation.