Electromagnetism uniqueness theorem

The electromagnetism uniqueness theorem states the uniqueness (but not necessarily the existence) of a solution to Maxwell's equations, if the boundary conditions provided satisfy the following requirements:^[1]^[2]

At $t=0$ , the initial values of all fields ( $E$ , $H$ , $B$ and $D$ ) everywhere (in the entire volume considered) is specified;
For all times (of consideration), the component of either the electric field $E$ or the magnetic field $H$ tangential to the boundary surface ( ${\hat {n}}\times \mathbf {E}$ or ${\hat {n}}\times \mathbf {H}$ , where ${\hat {n}}$ is the normal vector at a point on the boundary surface) is specified.

Note that this theorem must not be misunderstood as that providing boundary conditions (or the field solution itself) uniquely fixes a source distribution, when the source distribution is outside of the volume specified in the initial condition. One example is that the field outside a uniformly charged sphere may also be produced by a point charge placed at the center of the sphere instead, i.e. the source needed to produce such field at a boundary outside the sphere is not unique.

^ Smith, Glenn S. (1997-08-13). An Introduction to Classical Electromagnetic Radiation. Cambridge University Press. ISBN 9780521586986.
^ "2.8: Uniqueness Theorem". Physics LibreTexts. 2020-05-11. Retrieved 2022-12-11.

[1] Smith, Glenn S. (1997-08-13). An Introduction to Classical Electromagnetic Radiation. Cambridge University Press. ISBN 9780521586986.

[2] "2.8: Uniqueness Theorem". Physics LibreTexts. 2020-05-11. Retrieved 2022-12-11.

[1]

[2]