Sommerfeld radiation condition

In applied mathematics, and theoretical physics, the Sommerfeld radiation condition is a concept from theory of differential equations and scattering theory used for choosing a particular solution to the Helmholtz equation. It was introduced by Arnold Sommerfeld in 1912 and is closely related to the limiting absorption principle (1905) and the limiting amplitude principle (1948).

The boundary condition established by the principle essentially chooses a solution of some wave equations which only radiates outwards from known sources, disallowing arbitrary inbound waves propagating in from infinity.

The theorem most underpinned by the condition only holds true in three spatial dimensions, in which the power of a wave is inversely proportional to the square of the radial distance. This is not the case in two dimensions. On the other hand, in four or more spatial dimensions, power in wave motion falls off much faster in distance.