Main Page: Difference between revisions

From formulasearchengine
Jump to navigation Jump to search
No edit summary
No edit summary
Line 1: Line 1:
{{Unreferenced|date=December 2009}}
In [[differential geometry]], the '''first fundamental form''' is the [[inner product]] on the [[tangent space]] of a [[surface]] in three-dimensional [[Euclidean space]] which is induced [[canonical form|canonically]] from the [[dot product]] of '''R'''<sup>''3''</sup>.  It permits the calculation of [[curvature]] and metric properties of a surface such as length and area in a manner consistent with the [[ambient space]]. The first fundamental form is denoted by the Roman numeral I,
This is a [[glossary]] of terms specific to [[differential geometry]] and [[differential topology]].
:<math>\!\mathrm{I}(x,y)= \langle x,y \rangle.</math>
The following two glossaries are closely related:
*[[Glossary of general topology]]
*[[Glossary of Riemannian and metric geometry]].


See also:
Let ''X''(''u'',&nbsp;''v'') be a [[parametric surface]].  Then the inner product of two [[tangent vector]]s is
*[[List of differential geometry topics]]


Words in ''italics'' denote a self-reference to this glossary.
:<math>
\begin{align}
& {} \quad \mathrm{I}(aX_u+bX_v,cX_u+dX_v) \\
& = ac \langle X_u,X_u \rangle + (ad+bc) \langle X_u,X_v \rangle + bd \langle X_v,X_v \rangle \\
& = Eac + F(ad+bc) + Gbd,
\end{align}
</math>


{{compactTOC8|side=yes|top=yes|num=yes}}
where ''E'', ''F'', and ''G'' are the '''coefficients of the first fundamental form'''.
__NOTOC__


==A==
The first fundamental form may be represented as a [[symmetric matrix]].


'''[[Atlas (topology)|Atlas]]'''
:<math>\!\mathrm{I}(x,y) = x^T
\begin{pmatrix}
E & F \\
F & G
\end{pmatrix}y
</math>


==B==
==Further notation==
When the first fundamental form is written with only one argument, it denotes the inner product of that vector with itself.
:<math>\!\mathrm{I}(v)= \langle v,v \rangle = |v|^2</math>


'''Bundle''', see ''fiber bundle''.
The first fundamental form is often written in the modern notation of the [[metric tensor]]. The coefficients may then be written as <math>g_{ij}</math>:
:<math> \left(g_{ij}\right) = \begin{pmatrix}g_{11} & g_{12} \\g_{21} & g_{22}\end{pmatrix} =\begin{pmatrix}E & F \\F & G\end{pmatrix}</math>


==C==
The components of this tensor are calculated as the scalar product of tangent vectors ''X''<sub>1</sub> and ''X''<sub>2</sub>:


'''[[Chart (topology)|Chart]]'''
:<math>g_{ij} = X_i \cdot X_j</math>


'''[[Cobordism]]'''
for ''i'', ''j'' = 1, 2. See example below.


'''[[Codimension]]'''. The codimension of a submanifold is the dimension of the ambient space minus the dimension of the submanifold.
==Calculating lengths and areas==


'''[[Connected sum]]'''
The first fundamental form completely describes the metric properties of a surface.  Thus, it enables one to calculate the lengths of curves on the surface and the areas of regions on the surface.  The [[line element]] ''ds'' may be expressed in terms of the coefficients of the first fundamental form as
:<math>ds^2 = Edu^2+2Fdudv+Gdv^2 \,</math>. <!--- "\," improves the display of this formula in Wikipedia. Do not delete --->


'''[[Connection (mathematics)|Connection]]'''
The classical area element given by <math> dA = |X_u \times X_v| \ du\, dv</math> can be expressed in terms of the first fundamental form with the assistance of [[Lagrange's identity]],


'''[[Cotangent bundle]]''', the vector bundle of cotangent spaces on a manifold.
:<math>dA = |X_u \times X_v| \ du\, dv= \sqrt{ \langle X_u,X_u \rangle \langle X_v,X_v \rangle - \langle X_u,X_v \rangle^2 } \ du\, dv = \sqrt{EG-F^2} \, du\, dv.</math>


'''[[Cotangent space]]'''
===Example===


==D==
The unit [[sphere]] in '''R'''<sup>''3''</sup> may be parametrized as


'''[[Diffeomorphism]].''' Given two [[Manifold#Differentiable_manifolds|differentiable manifolds]]
:<math>X(u,v) = \begin{pmatrix} \cos u \sin v \\ \sin u \sin v \\ \cos v \end{pmatrix},\ (u,v) \in [0,2\pi) \times [0,\pi).</math>
''M'' and ''N'', a [[bijective map]] <math>f</math> from ''M'' to ''N'' is called a '''diffeomorphism''' if both <math>f:M\to N</math> and its inverse <math>f^{-1}:N\to M</math> are [[smooth function]]s.


'''Doubling,''' given a manifold ''M'' with boundary, doubling is taking two copies  of ''M'' and identifying their boundaries.
Differentiating <math>X(u,v)</math> with respect to u and v yields
As the result we get a manifold without boundary.


==E==
:<math>X_u = \begin{pmatrix} -\sin u \sin v \\ \cos u \sin v \\ 0 \end{pmatrix},\ X_v = \begin{pmatrix} \cos u \cos v \\ \sin u \cos v \\ -\sin v \end{pmatrix}.</math>


'''[[Embedding]]'''
The coefficients of the first fundamental form may be found by taking the dot product of the [[partial derivatives]].


==F==
:<math>E = X_u \cdot X_u = \sin^2 v</math>
:<math>F = X_u \cdot X_v = 0</math>
:<math>G = X_v \cdot X_v = 1</math>


'''Fiber'''. In a fiber bundle, π: ''E'' → ''B'' the [[preimage]] π<sup>&minus;1</sup>(''x'') of a point ''x'' in the base ''B'' is called the fiber over ''x'', often denoted ''E''<sub>''x''</sub>.
====Length of a curve on the sphere====


'''[[Fiber bundle]]'''
The [[equator]] of the sphere is a parametrized curve given by <math>(u(t),v(t))=(t,\frac{\pi}{2})</math> with t ranging from 0 to <math>2\pi</math>.  The line element may be used to calculate the length of this curve.


'''Frame'''.  A '''frame''' at a point of a [[differentiable manifold]] ''M'' is a [[basis of a vector space|basis]] of the [[tangent space]] at the point. 
:<math>\int_0^{2\pi} \sqrt{ E\left(\frac{du}{dt}\right)^2 + 2F\frac{du}{dt}\frac{dv}{dt} + G\left(\frac{dv}{dt}\right)^2 } \,dt = \int_0^{2\pi} |\sin v| \,dt = 2\pi \sin \frac{\pi}{2} = 2\pi</math>


'''[[Frame bundle]]''', the principal bundle of frames on a smooth manifold.
====Area of a region on the sphere====


'''[[Flow (mathematics)|Flow]]'''
The area element may be used to calculate the area of the sphere.


==G==
:<math>\int_0^{\pi} \int_0^{2\pi} \sqrt{ EG-F^2 } \ du\, dv = \int_0^{\pi} \int_0^{2\pi} \sin v \, du\, dv = 2\pi \left[-\cos v\right]_0^{\pi} = 4\pi</math>


'''[[Genus (mathematics)|Genus]]'''
==Gaussian curvature==


==H==
The [[Gaussian curvature]] of a surface is given by


'''Hypersurface'''. A hypersurface is a submanifold of ''codimension'' one.
:<math> K = \frac{\det \mathrm{I\!I}}{\det \mathrm{I}} = \frac{ LN-M^2}{EG-F^2 }, </math>


==I==
where ''L'', ''M'', and ''N'' are the coefficients of the [[second fundamental form]].


'''[[Embedding|Immersion]]'''
[[Theorema egregium]] of [[Carl Friedrich Gauss|Gauss]] states that the Gaussian curvature of a surface can be expressed solely in terms of the first fundamental form and its derivatives, so that ''K'' is in fact an intrinsic invariant of the surface. An explicit expression for the Gaussian curvature in terms of the first fundamental form is provided by the [[Gaussian curvature#Alternative_formulas|Brioschi formula]].


==L==
==See also==
*[[Metric tensor]]
*[[Second fundamental form]]


'''[[Lens space]]'''. A lens space is a quotient of the [[3-sphere]] (or (2''n'' + 1)-sphere) by a free isometric [[group action|action]] of [[cyclic group|'''Z'''<sub>k</sub>]].
==External links==
*[http://mathworld.wolfram.com/FirstFundamentalForm.html First Fundamental Form &mdash; from Wolfram MathWorld]
*[http://planetmath.org/encyclopedia/FirstFundamentalForm.html PlanetMath: first fundamental form]


==M==
{{curvature}}


'''[[Manifold]]'''. A topological manifold is a locally Euclidean [[Hausdorff space]]. (In Wikipedia, a manifold need not be [[paracompact]] or [[second-countable space|second-countable]].) A ''C<sup>k</sup>'' manifold is a differentiable manifold whose chart overlap functions are ''k'' times continuously differentiable. A ''C''<sup>∞</sup> or smooth manifold is a differentiable manifold whose chart overlap functions are infinitely continuously differentiable.
[[Category:Differential geometry of surfaces]]
 
[[Category:Differential geometry]]
==P==
[[Category:Surfaces]]
 
'''[[Parallelizable]]'''. A smooth manifold is parallelizable if it admits a smooth global frame. This is equivalent to the tangent bundle being trivial.
 
'''[[Principal bundle]]'''. A principal bundle is a fiber bundle ''P'' → ''B'' together with an [[group action|action]] on ''P'' by a [[Lie group]] ''G'' that preserves the fibers of ''P'' and acts simply transitively on those  fibers.
 
'''[[Pullback]]'''
 
==S==
 
'''[[Section (fiber bundle)|Section]]'''
 
'''Submanifold'''. A submanifold is the image of a smooth embedding of a manifold.
 
'''[[Submersion (mathematics)|Submersion]]'''
 
'''[[Surface]]''', a two-dimensional manifold or submanifold.
 
'''[[systolic geometry|Systole]]''', least length of a noncontractible loop.
 
==T==
 
'''[[Tangent bundle]]''', the vector bundle of tangent spaces on a differentiable manifold.
 
'''Tangent field''', a ''section'' of the tangent bundle. Also called a ''vector field''.
 
'''[[Tangent space]]'''
 
'''[[Torus]]'''
 
'''Transversality'''. Two submanifolds ''M'' and ''N'' intersect transversally if at each point of intersection ''p'' their tangent spaces <math>T_p(M)</math> and <math>T_p(N)</math> generate the whole tangent space at ''p'' of the total manifold.
 
'''Trivialization'''
 
==V==
 
'''[[Vector bundle]]''', a fiber bundle whose fibers are vector spaces and whose transition functions are linear maps.
 
'''[[Vector field]]''', a section of a vector bundle. More specifically, a vector field can mean a section of the tangent bundle.
 
==W==
 
'''[[Whitney sum]]'''. A Whitney sum is an analog of the direct product for vector bundles. Given two vector bundles α and β over the same base ''B'' their [[cartesian product]] is a vector bundle over ''B'' &times;''B''. The diagonal map <math>B\to B\times B</math> induces a vector bundle over ''B'' called the Whitney sum of these vector bundles and denoted by α⊕β.
 
{{DEFAULTSORT:Glossary Of Differential Geometry And Topology}}
[[Category:Glossaries of mathematics|Geometry]]
[[Category:Differential geometry| ]]
[[Category:Differential topology| ]]

Revision as of 05:07, 12 August 2014

In differential geometry, the first fundamental form is the inner product on the tangent space of a surface in three-dimensional Euclidean space which is induced canonically from the dot product of R3. It permits the calculation of curvature and metric properties of a surface such as length and area in a manner consistent with the ambient space. The first fundamental form is denoted by the Roman numeral I,

I(x,y)=x,y.

Let X(uv) be a parametric surface. Then the inner product of two tangent vectors is

I(aXu+bXv,cXu+dXv)=acXu,Xu+(ad+bc)Xu,Xv+bdXv,Xv=Eac+F(ad+bc)+Gbd,

where E, F, and G are the coefficients of the first fundamental form.

The first fundamental form may be represented as a symmetric matrix.

I(x,y)=xT(EFFG)y

Further notation

When the first fundamental form is written with only one argument, it denotes the inner product of that vector with itself.

I(v)=v,v=|v|2

The first fundamental form is often written in the modern notation of the metric tensor. The coefficients may then be written as gij:

(gij)=(g11g12g21g22)=(EFFG)

The components of this tensor are calculated as the scalar product of tangent vectors X1 and X2:

gij=XiXj

for i, j = 1, 2. See example below.

Calculating lengths and areas

The first fundamental form completely describes the metric properties of a surface. Thus, it enables one to calculate the lengths of curves on the surface and the areas of regions on the surface. The line element ds may be expressed in terms of the coefficients of the first fundamental form as

ds2=Edu2+2Fdudv+Gdv2.

The classical area element given by dA=|Xu×Xv|dudv can be expressed in terms of the first fundamental form with the assistance of Lagrange's identity,

dA=|Xu×Xv|dudv=Xu,XuXv,XvXu,Xv2dudv=EGF2dudv.

Example

The unit sphere in R3 may be parametrized as

X(u,v)=(cosusinvsinusinvcosv),(u,v)[0,2π)×[0,π).

Differentiating X(u,v) with respect to u and v yields

Xu=(sinusinvcosusinv0),Xv=(cosucosvsinucosvsinv).

The coefficients of the first fundamental form may be found by taking the dot product of the partial derivatives.

E=XuXu=sin2v
F=XuXv=0
G=XvXv=1

Length of a curve on the sphere

The equator of the sphere is a parametrized curve given by (u(t),v(t))=(t,π2) with t ranging from 0 to 2π. The line element may be used to calculate the length of this curve.

02πE(dudt)2+2Fdudtdvdt+G(dvdt)2dt=02π|sinv|dt=2πsinπ2=2π

Area of a region on the sphere

The area element may be used to calculate the area of the sphere.

0π02πEGF2dudv=0π02πsinvdudv=2π[cosv]0π=4π

Gaussian curvature

The Gaussian curvature of a surface is given by

K=detIIdetI=LNM2EGF2,

where L, M, and N are the coefficients of the second fundamental form.

Theorema egregium of Gauss states that the Gaussian curvature of a surface can be expressed solely in terms of the first fundamental form and its derivatives, so that K is in fact an intrinsic invariant of the surface. An explicit expression for the Gaussian curvature in terms of the first fundamental form is provided by the Brioschi formula.

See also

External links

Template:Curvature