Generalized Huygens principle with pulsed-beam wavelets

Abstract

Huygens' principle has a well-known problem with back-propagation due to the spherical nature of the secondary wavelets. We solve this by analytically continuing the surface of integration. If the surface is a sphere of radius R, this is done by complexifying R to R+ia. The resulting complex sphere is shown to be a real bundle of disks with radius a tangent to the sphere. Huygens' "secondary source points" are thus replaced by disks, and his spherical wavelets by well-focused pulsed beams propagating outward. This solves the back-propagation problem. The extended Huygens principle is a completeness relation for pulsed beams, giving a representation of a general radiation field as a superposition of such beams. Furthermore, it naturally yields a very efficient way to compute radiation fields because all pulsed beams missing a given observer can be ignored. Increasing a sharpens the focus of the pulsed beams, which in turn raises the compression of the representation.