In mathematics, a volume form or topdimensional form is a differential form of degree equal to the differentiable manifold dimension. Thus on a manifold of dimension , a volume form is an form. It is an element of the space of sections of the line bundle , denoted as . A manifold admits a nowherevanishing volume form if and only if it is orientable. An orientable manifold has infinitely many volume forms, since multiplying a volume form by a function yields another volume form. On nonorientable manifolds, one may instead define the weaker notion of a density.
A volume form provides a means to define the integral of a function on a differentiable manifold. In other words, a volume form gives rise to a measure with respect to which functions can be integrated by the appropriate Lebesgue integral. The absolute value of a volume form is a volume element, which is also known variously as a twisted volume form or pseudovolume form. It also defines a measure, but exists on any differentiable manifold, orientable or not.
Kähler manifolds, being complex manifolds, are naturally oriented, and so possess a volume form. More generally, the th exterior power of the symplectic form on a symplectic manifold is a volume form. Many classes of manifolds have canonical volume forms: they have extra structure which allows the choice of a preferred volume form. Oriented pseudoRiemannian manifolds have an associated canonical volume form.
The following will only be about orientability of differentiable manifolds (it's a more general notion defined on any topological manifold).
A manifold is orientable if it has a coordinate atlas all of whose transition functions have positive Jacobian determinants. A selection of a maximal such atlas is an orientation on A volume form on gives rise to an orientation in a natural way as the atlas of coordinate charts on that send to a positive multiple of the Euclidean volume form
A volume form also allows for the specification of a preferred class of frames on Call a basis of tangent vectors righthanded if
The collection of all righthanded frames is acted upon by the group of general linear mappings in dimensions with positive determinant. They form a principal subbundle of the linear frame bundle of and so the orientation associated to a volume form gives a canonical reduction of the frame bundle of to a subbundle with structure group That is to say that a volume form gives rise to structure on More reduction is clearly possible by considering frames that have

(1) 
Thus a volume form gives rise to an structure as well. Conversely, given an structure, one can recover a volume form by imposing (1) for the special linear frames and then solving for the required form by requiring homogeneity in its arguments.
A manifold is orientable if and only if it has a nowherevanishing volume form. Indeed, is a deformation retract since where the positive reals are embedded as scalar matrices. Thus every structure is reducible to an structure, and structures coincide with orientations on More concretely, triviality of the determinant bundle is equivalent to orientability, and a line bundle is trivial if and only if it has a nowherevanishing section. Thus, the existence of a volume form is equivalent to orientability.
See also: Density on a manifold 
Given a volume form on an oriented manifold, the density is a volume pseudoform on the nonoriented manifold obtained by forgetting the orientation. Densities may also be defined more generally on nonorientable manifolds.
Any volume pseudoform (and therefore also any volume form) defines a measure on the Borel sets by
The difference is that while a measure can be integrated over a (Borel) subset, a volume form can only be integrated over an oriented cell. In single variable calculus, writing considers as a volume form, not simply a measure, and indicates "integrate over the cell with the opposite orientation, sometimes denoted ".
Further, general measures need not be continuous or smooth: they need not be defined by a volume form, or more formally, their Radon–Nikodym derivative with respect to a given volume form need not be absolutely continuous.
Given a volume form on one can define the divergence of a vector field as the unique scalarvalued function, denoted by satisfying
The solenoidal vector fields are those with It follows from the definition of the Lie derivative that the volume form is preserved under the flow of a solenoidal vector field. Thus solenoidal vector fields are precisely those that have volumepreserving flows. This fact is wellknown, for instance, in fluid mechanics where the divergence of a velocity field measures the compressibility of a fluid, which in turn represents the extent to which volume is preserved along flows of the fluid.
For any Lie group, a natural volume form may be defined by translation. That is, if is an element of then a leftinvariant form may be defined by where is lefttranslation. As a corollary, every Lie group is orientable. This volume form is unique up to a scalar, and the corresponding measure is known as the Haar measure.
Any symplectic manifold (or indeed any almost symplectic manifold) has a natural volume form. If is a dimensional manifold with symplectic form then is nowhere zero as a consequence of the nondegeneracy of the symplectic form. As a corollary, any symplectic manifold is orientable (indeed, oriented). If the manifold is both symplectic and Riemannian, then the two volume forms agree if the manifold is Kähler.
Any oriented pseudoRiemannian (including Riemannian) manifold has a natural volume form. In local coordinates, it can be expressed as
The volume form is denoted variously by
Here, the is the Hodge star, thus the last form, emphasizes that the volume form is the Hodge dual of the constant map on the manifold, which equals the LeviCivita tensor
Although the Greek letter is frequently used to denote the volume form, this notation is not universal; the symbol often carries many other meanings in differential geometry (such as a symplectic form).
Volume forms are not unique; they form a torsor over nonvanishing functions on the manifold, as follows. Given a nonvanishing function on and a volume form is a volume form on Conversely, given two volume forms their ratio is a nonvanishing function (positive if they define the same orientation, negative if they define opposite orientations).
In coordinates, they are both simply a nonzero function times Lebesgue measure, and their ratio is the ratio of the functions, which is independent of choice of coordinates. Intrinsically, it is the Radon–Nikodym derivative of with respect to On an oriented manifold, the proportionality of any two volume forms can be thought of as a geometric form of the Radon–Nikodym theorem.
A volume form on a manifold has no local structure in the sense that it is not possible on small open sets to distinguish between the given volume form and the volume form on Euclidean space (Kobayashi 1972). That is, for every point in there is an open neighborhood of and a diffeomorphism of onto an open set in such that the volume form on is the pullback of along
As a corollary, if and are two manifolds, each with volume forms then for any points there are open neighborhoods of and of and a map such that the volume form on restricted to the neighborhood pulls back to volume form on restricted to the neighborhood :
In one dimension, one can prove it thus: given a volume form on define
A volume form on a connected manifold has a single global invariant, namely the (overall) volume, denoted which is invariant under volumeform preserving maps; this may be infinite, such as for Lebesgue measure on On a disconnected manifold, the volume of each connected component is the invariant.
In symbols, if is a homeomorphism of manifolds that pulls back to then
Volume forms can also be pulled back under covering maps, in which case they multiply volume by the cardinality of the fiber (formally, by integration along the fiber). In the case of an infinite sheeted cover (such as ), a volume form on a finite volume manifold pulls back to a volume form on an infinite volume manifold.