Incompressible vector field
An incompressible vector field or solenoidal vector field is a field with a vector potential, i.e. there exists
The vector potential of an incompressible field is clearly only unique up to the addition of a irrotational term, i.e. the gradient of some scalar-valued function.
Properties
A vector field is incompressible iff. any of the following1
everywhere - Flux integrals over a surface
only depend on the boundary , and are zero for a closed surface. - There exists some
such that .