Divergence
of a vector field 
at a point 
The scalar field
 |
where 
are the components of the vector field 
.
The divergence is denoted by 
or by the inner product 
of the Hamilton operator 
and the vector 
.
If the vector field 
is the field of velocities of a stationary flow of a non-compressible liquid, 
coincides with the intensity of the source (
) or the sink (
) at the point 
.
The integral
 |
where 
is the density of the liquid computed for the 
-dimensional domain 
, is equal to the amount of the liquid "issuing" from 
in unit time. This amount (cf. Ostrogradski formula) coincides with the magnitude
 |
where 
is the unit exterior normal vector to 
, and 
is the area element of 
. The divergence 
is the derivative with respect to the rate of the flow 
across the closed surface:
 |
Thus, the divergence is invariant with respect to the choice of the coordinate system.
In curvilinear coordinates 
, 
, 
,
 | (*) |
 |
where
 |
and 
is the unit tangent vector to the 
-th coordinate line at the point 
:
 |
The divergence of a tensor field
 |
of type 
defined in a domain of an 
-dimensional manifold with an affine connection, is defined with the aid of the corresponding absolute (covariant) derivatives of the components of 
, with subsequent convolution (contraction), and is a tensor of type 
with components
 |
 |
In tensor analysis and differential geometry a differential operator operating on the space of differential forms and connected with the operator of exterior differentiation is also called a divergence.
References
| [1] | N.E. Kochin, "Vector calculus and fundamentals of tensor calculus" , Moscow (1965) (In Russian) |
| [2] | P.K. [P.K. Rashevskii] Rashewski, "Riemannsche Geometrie und Tensoranalyse" , Deutsch. Verlag Wissenschaft. (1959) (Translated from Russian) |
Comments
The Hamilton operator is usually called nabla operator, after the symbol for it, 
. Ostrogradski's formula is better known as the Gauss–Ostrogradski or Gauss formula.
For other vector differentiation operators see Curl; Gradient. For relations between these see also Vector analysis.
Let 
be an 
-dimensional manifold and 
a volume element on 
. The Lie derivative 
is then also a differential 
-form and so 
for some function 
on 
. This function is the divergence 
of 
with respect to the volume element 
. If 
is a Riemannian metric on 
, then the divergence of 
as defined by (*) above is the divergence of 
with respect to the volume element 
defined by 
. For any function 
, 
is an 
-form, so 
is defined — the integral of a function 
with respect to a volume element 
. If 
is compact, then Green's theorem says that
 |
Still another notation for the divergence of an 
-tuple 
of functions of 
(or of a vector field) is 
.
References
| [a1] | D.E. Bourne, P.C. Kendall, "Vector analysis and Cartesian tensors" , Nelson & Sons , Sunbury-on-Thames (1977) Zbl 0781.53013 |
Divergence. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Divergence&oldid=39958