In mathematics, a volume element provides a means for integrating a function with respect to volume in various coordinate systems such as spherical coordinates and cylindrical coordinates. Thus a volume element is an expression of the form
Contents
- Volume element in Euclidean space
- Volume element of a linear subspace
- Volume element of manifolds
- Area element of a surface
- Example Sphere
- References
where the
For example, in spherical coordinates
The notion of a volume element is not limited to three dimensions: in two dimensions it is often known as the area element, and in this setting it is useful for doing surface integrals. Under changes of coordinates, the volume element changes by the absolute value of the Jacobian determinant of the coordinate transformation (by the change of variables formula). This fact allows volume elements to be defined as a kind of measure on a manifold. On an orientable differentiable manifold, a volume element typically arises from a volume form: a top degree differential form. On a non-orientable manifold, the volume element is typically the absolute value of a (locally defined) volume form: it defines a 1-density.
Volume element in Euclidean space
In Euclidean space, the volume element is given by the product of the differentials of the Cartesian coordinates
In different coordinate systems of the form
For example, in spherical coordinates
the Jacobian is
so that
This can be seen as a special case of the fact that differential forms transform through a pullback
Volume element of a linear subspace
Consider the linear subspace of the n-dimensional Euclidean space Rn that is spanned by a collection of linearly independent vectors
To find the volume element of the subspace, it is useful to know the fact from linear algebra that the volume of the parallelepiped spanned by the
Any point p in the subspace can be given coordinates
At a point p, if we form a small parallelepiped with sides
This therefore defines the volume form in the linear subspace.
Volume element of manifolds
On an oriented Riemannian manifold of dimension n, the volume element is a volume form equal to the Hodge dual of the unit constant function,
Equivalently, the volume element is precisely the Levi-Civita tensor
where
Area element of a surface
A simple example of a volume element can be explored by considering a two-dimensional surface embedded in n-dimensional Euclidean space. Such a volume element is sometimes called an area element. Consider a subset
thus defining a surface embedded in
that allows one to compute the area of a set B lying on the surface by computing the integral
Here we will find the volume element on the surface that defines area in the usual sense. The Jacobian matrix of the mapping is
with index i running from 1 to n, and j running from 1 to 2. The Euclidean metric in the n-dimensional space induces a metric
The determinant of the metric is given by
For a regular surface, this determinant is non-vanishing; equivalently, the Jacobian matrix has rank 2.
Now consider a change of coordinates on U, given by a diffeomorphism
so that the coordinates
In the new coordinates, we have
and so the metric transforms as
where
Given the above construction, it should now be straightforward to understand how the volume element is invariant under an orientation-preserving change of coordinates.
In two dimensions, the volume is just the area. The area of a subset
Thus, in either coordinate system, the volume element takes the same expression: the expression of the volume element is invariant under a change of coordinates.
Note that there was nothing particular to two dimensions in the above presentation; the above trivially generalizes to arbitrary dimensions.
Example: Sphere
For example, consider the sphere with radius r centered at the origin in R3. This can be parametrized using spherical coordinates with the map
Then
and the area element is