In the mathematical field of

Riemannian geometry Riemannian geometry is the branch of differential geometry that studies Riemannian manifolds, smooth manifolds with a ''Riemannian metric'', i.e. with an inner product on the tangent space at each point that varies smoothly from point to point ...

, every

submanifold In mathematics, a submanifold of a manifold ''M'' is a subset ''S'' which itself has the structure of a manifold, and for which the inclusion map satisfies certain properties. There are different types of submanifolds depending on exactly which ...

of a Riemannian manifold has a surface area. The first variation of area formula is a fundamental computation for how this quantity is affected by the deformation of the submanifold. The fundamental quantity is to do with the

mean curvature In mathematics, the mean curvature H of a surface S is an ''extrinsic'' measure of curvature that comes from differential geometry and that locally describes the curvature of an embedded surface in some ambient space such as Euclidean space. The ...

. Let denote a Riemannian manifold, and consider an oriented smooth manifold (possibly with boundary) together with a one-parameter family of smooth

immersion Immersion may refer to: The arts * "Immersion", a 2012 story by Aliette de Bodard * ''Immersion'', a French comic book series by Léo Quievreux#Immersion, Léo Quievreux * Immersion (album), ''Immersion'' (album), the third album by Australian gro ...

s of into . For each individual value of the parameter , the immersion induces a

Riemannian metric In differential geometry, a Riemannian manifold or Riemannian space , so called after the German mathematician Bernhard Riemann, is a real, smooth manifold ''M'' equipped with a positive-definite inner product ''g'p'' on the tangent space '' ...

on , which itself induces a differential form on known as the

Riemannian volume form In mathematics, a volume form or top-dimensional form is a differential form of degree equal to the differentiable manifold dimension. Thus on a manifold M of dimension n, a volume form is an n-form. It is an element of the space of sections of the ...

. The ''first variation of area'' refers to the computation :

\frac\omega_t=-\left\langle W_t,H(f_t)\right\rangle_g\omega_t+\text\left(\iota_\omega_t\right)

in which is the mean curvature vector of the immersion and denotes the ''variation vector field''

\fracf_t.

Both of these quantities are vector fields along the map . The second term in the formula represents the exterior derivative of the

interior product In mathematics, the interior product (also known as interior derivative, interior multiplication, inner multiplication, inner derivative, insertion operator, or inner derivation) is a degree −1 (anti)derivation on the exterior algebra of ...

of the volume form with the vector field

W_t^\parallel

on , defined as the tangential projection of . Via Cartan's magic formula, this term can also be written as the

Lie derivative In differential geometry, the Lie derivative ( ), named after Sophus Lie by Władysław Ślebodziński, evaluates the change of a tensor field (including scalar functions, vector fields and one-forms), along the flow defined by another vector fi ...

of the volume form relative to the tangential projection. As such, this term vanishes if each is reparametrized by the corresponding one-parameter family of diffeomorphisms of . Both sides of the first variation formula can be integrated over , provided that the variation vector field has compact support. In that case it is immediate from Stokes' theorem that :

\frac\operatorname(f_t)=-\int_S \left\langle W_t,H(f_t)\right\rangle_g\omega_t+\int_\iota_\omega_t.

In many contexts, is a closed manifold or the variation vector field is every orthogonal to the submanifold. In either case, the second term automatically vanishes. In such a situation, the mean curvature vector is seen as entirely governing how the surface area of a submanifold is modified by a deformation of the surface. In particular, the vanishing of the mean curvature vector is seen as being equivalent to submanifold being a critical point of the volume functional. This shows how a

minimal submanifold In mathematics, a minimal surface is a surface that locally minimizes its area. This is equivalent to having zero mean curvature (see definitions below). The term "minimal surface" is used because these surfaces originally arose as surfaces tha ...

can be characterized either by the critical point theory of the volume functional or by an explicit partial differential equation for the immersion. The special case of the first variation formula arising when is an interval on the

real number line In elementary mathematics, a number line is a picture of a graduated straight line that serves as visual representation of the real numbers. Every point of a number line is assumed to correspond to a real number, and every real number to a poin ...

is particularly well-known. In this context, the volume functional is known as the ''length functional'' and its variational analysis is fundamental to the study of geodesics in Riemannian geometry.

References

* * * * {{cite book, mr=0532833, author-link1=Michael Spivak, last1=Spivak, first1=Michael, title=A comprehensive introduction to differential geometry. Volume IV, edition=Second, publisher=Publish or Perish, Inc., location=Wilmington, DE, year=1979, isbn=0-914098-83-7 Riemannian geometry