Second fundamental form

Second fundamental form
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In differential geometry, the second fundamental form is a quadratic form on the tangent plane of a smooth surface in the three dimensional Euclidean space, usually denoted by II. Together with the first fundamental form, it serves to define extrinsic invariants of the surface, its principal curvatures. More generally, such a quadratic form is defined for a smooth hypersurface in a Riemannian manifold and a smooth choice of the unit normal vector at each point.

content

1 Surface in R³
2 Hypersurface in a Riemannian manifold
- 2.1 Generalization to arbitrary codimension
3 See also
4 References
5 External links

Surface in R³

Motivation

The second fundamental form of a parametric surface S in R³ was introduced and studied by Gauss. First suppose that the surface is the graph of a twice continuously differentiable function, z = f(x,y), and that the plane z = 0 is tangent to the surface at the origin. Then f and its partial derivatives with respect to x and y vanish at (0,0). Therefore, the Taylor expansion of f at (0,0) starts with quadratic terms:

$z=L\frac{x^2}{2} + Mxy + N\frac{y^2}{2} + \mathrm{\scriptstyle{{\ }higher{\ }order{\ }terms}},$

and the second fundamental form at the origin in the coordinates x, y is the quadratic form

$L dx^2 + 2M dx dy + N dy^2. \,$

For a smooth point P on S, one can choose the coordinate system so that the coordinate z-plane is tangent to S at P and define the second fundamental form in the same way.

Classical notation

The second fundamental form of a general parametric surface is defined as follows. Let r=r(u,v) be a regular parametrization of a surface in R³, where r is a smooth vector valued function of two variables. It is common to denote the partial derivatives of r with respect to u and v by r_u and r_v. Regularity of the parametrization means that r_u and r_v are linearly independent for any (u,v) in the domain of r, and hence span the tangent plane to S at each point. Equivalently, the cross product r_u × r_v is a nonzero vector normal to the surface. The parametrization thus defines a field of unit normal vectors n:

$\mathbf{n} = \frac{\mathbf{r}_u\times\mathbf{r}_v}{|\mathbf{r}_u\times\mathbf{r}_v|}.$

The second fundamental form is usually written as

$\mathrm{II} = Ldu^2 + 2Mdudv + Ndv^2, \,$

its matrix in the basis {r_u, r_v} of the tangent plane is

$\begin{bmatrix} L&M\\ M&N \end{bmatrix}.$

The coefficients L, M, N at a given point in the parametric uv-plane are given by the projections of the second partial derivatives of r at that point onto the normal line to S and can be computed with the aid of the dot product as follows:

$L = \mathbf{r}_{uu} \cdot \mathbf{n}, \quad M = \mathbf{r}_{uv} \cdot \mathbf{n}, \quad N = \mathbf{r}_{vv} \cdot \mathbf{n}.$

Modern notation

The second fundamental form of a general parametric surface S is defined as follows: Let r=r(u¹,u²) be a regular parametrization of a surface in R³, where r is a smooth vector valued function of two variables. It is common to denote the partial derivatives of r with respect to u^α by r_α, α = 1, 2. Regularity of the parametrization means that r₁ and r₂ are linearly independent for any (u¹,u²) in the domain of r, and hence span the tangent plane to S at each point. Equivalently, the cross product r₁ × r₂ is a nonzero vector normal to the surface. The parametrization thus defines a field of unit normal vectors n:

$\mathbf{n} = \frac{\mathbf{r}_1\times\mathbf{r}_2}{|\mathbf{r}_1\times\mathbf{r}_2|}.$

The second fundamental form is usually written as

$\mathrm{II} = b_{\alpha, \beta} du^{\alpha} du^{\beta}. \,$

The equation above implies Einstein Summation Convention. The coefficients b_α,β at a given point in the parametric (u¹, u²)-plane are given by the projections of the second partial derivatives of r at that point onto the normal line to S and can be computed with the aid of the dot product as follows:

$b_{\alpha, \beta} = \mathbf{r}_{\alpha, \beta} \cdot \mathbf{n}.$

Hypersurface in a Riemannian manifold

In Euclidean space, the second fundamental form is given by

$I\!I(v,w) = \langle d\nu(v),w\rangle$

where $ν$ is the Gauss map, and $d ν$ the differential of $ν$ regarded as a vector valued differential form, and the brackets denote the metric tensor of Euclidean space.

More generally, on a Riemannian manifold, the second fundamental form is an equivalent way to describe the shape operator (denoted by S) of a hypersurface,

$\mathrm I\!\mathrm I(v,w)=\langle S(v),w\rangle= -\langle \nabla_v n,w\rangle=\langle n,\nabla_v w\rangle,$

where $\nabla_v w$ denotes the covariant derivative of the ambient manifold and n a field of normal vectors on the hypersurface. (If the affine connection is torsion-free, then the second fundamental form is symmetric.)

The sign of the second fundamental form depends on the choice of direction of n (which is called a co-orientation of the hypersurface - for surfaces in Euclidean space, this is equivalently given by a choice of orientation of the surface).

Generalization to arbitrary codimension

The second fundamental form can be generalized to arbitrary codimension. In that case it is a quadratic form on the tangent space with values in the normal bundle and it can be defined by

$\mathrm{I}\!\mathrm{I}(v,w)=(\nabla_v w)^\bot,$

where $(\nabla_v w)^\bot$ denotes the orthogonal projection of covariant derivative $\nabla_v w$ onto the normal bundle.

In Euclidean space, the curvature tensor of a submanifold can be described by the following formula:

$\langle R(u,v)w,z\rangle =\langle \mathrm I\!\mathrm I(u,z),\mathrm I\!\mathrm I(v,w)\rangle-\langle \mathrm I\!\mathrm I(u,w),\mathrm I\!\mathrm I(v,z)\rangle.$

This is called the Gauss equation, as it may be viewed as a generalization of Gauss's Theorema Egregium. The eigenvalues of the second fundamental form, represented in an orthonormal basis, are the principal curvatures of the surface. A collection of orthonormal eigenvectors are called the principal directions.

For general Riemannian manifolds one has to add the curvature of ambient space; if N is a manifold embedded in a Riemannian manifold (M,g) then the curvature tensor $R N$ of N with induced metric can be expressed using the second fundamental form and $R M$ , the curvature tensor of M:

$\langle R_N(u,v)w,z\rangle = \langle R_M(u,v)w,z\rangle+\langle \mathrm I\!\mathrm I(u,z),\mathrm I\!\mathrm I(v,w)\rangle-\langle \mathrm I\!\mathrm I(u,w),\mathrm I\!\mathrm I(v,z)\rangle.$

References

Guggenheimer, Heinrich (1977). "Chapter 10. Surfaces", Differential Geometry. Dover. ISBN 0-486-63433-7.
Kobayashi, Shoshichi and Nomizu, Katsumi (1996 (New edition)). Foundations of Differential Geometry, Vol. 2. Wiley-Interscience. ISBN 0471157325.
Spivak, Michael (1999). A Comprehensive introduction to differential geometry (Volume 3). Publish or Perish. ISBN 0-914098-72-1.

External links

A PHD thesis about the geometry of the second fundamental form by Steven Verpoort: https://repository.libis.kuleuven.be/dspace/bitstream/1979/1779/2/hierrrissiedan!.pdf

v • d • e Different notions of curvature defined in differential geometry

Differential geometry of curves	Curvature · Torsion of curve · Frenet-Serret formulas · Radius of curvature (applications) · Affine curvature · Total curvature

Differential geometry of surfaces	Principal curvatures · Gaussian curvature · Mean curvature · Darboux frame · Gauss–Codazzi equations · First fundamental form · Second fundamental form

Riemannian geometry	Curvature of Riemannian manifolds · Riemann curvature tensor · Ricci curvature · Scalar curvature · Sectional curvature

Curvature of connections	Curvature form · Torsion tensor · Cocurvature · Holonomy

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Surface in R3