84 7 Fields, Spatial Differential Operators
r=|r 1 −r 2 |only, when these particles are effectively round and do not posses any
internal directional properties, like electric dipole or quadrupole moments, which
influence their interaction.
7.2 Vector Fields, Divergence and Curl or Rotation
Letv(r)be a vector field with Cartesian componentsvμ(r). Here the symbolvcan be
associated with “vector”, in general, or with the flow velocity field of hydrodynamics.
Thevectorfieldmightalsobeassociatedwiththedisplacementinducedbyadeforma-
tion of an elastic solid. The mathematical considerations to be presented are invariant
with respect to different interpretations in physics.
Vector fields can be visualized as a field of arrows. At each pointr, an arrow can
be drawn, whose length and direction is determined byv(r). Firstly, some examples
are considered.
7.2.1 Examples for Vector Fields
(i) Homogeneous Field
As previously mentioned, a vector field of the typev=const., where the vector
everywhere has constant length and direction, is referred to as a homogeneous field.
Let the direction be specified by the constant unit vectore. Then one has, apart from
a numerical factor,
vμ=eμ=const.
This field is the gradient of the simple potential functionΦ=rνeν=x(Fig.7.1).
Fig. 7.1 Homogeneous and
linearly increasing vector
fields