There is a common notion that personal charm and magnetism can be lost through the passage of time. The universe has been expanding for about 10 billions years. If ever there was a perfect universal charm it would have vanished long ago. However, if this charm is localized then its beauty can only be found in the infinitesimal region of quantum space-time where and when magnetism still exists.

Is there any place across the universe with a zero magnetic field? Theoretically, zero magnetic fields exist outside an infinitely long solenoid with its cross sectional cylindrical radius approaching zero. This is described by the vector notation that the divergence of the solenoidal magnetic field B is zero: Ñ×B=0. If B is also irrotational then the curl of B is also zero: Ñ´B=0. Irrotational field is equivalent to a conservative or path independent field. If a force field F is irrotational then F´r is a solenoidal field. And a quantized solenoidal field would be the inner dot product of F´r with itself. The result is the square of energy E²=( F´r)×( F´r). Furthermore, a conservative field can be described as the negative gradient of a scalar potential. For example, the conservative gravitational force field G= -Ñj, where jis the central conservative gravitational potential.