Riemannian manifold

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In differential geometry, a Riemannian manifold is a geometric space on which many geometric notions such as distance, angles, length, volume, and curvature are defined. Euclidean space, the <math>n</math>-sphere, hyperbolic space, and smooth surfaces in three-dimensional space, such as ellipsoids and paraboloids, are all examples of Riemannian manifolds. Riemannian manifolds are named after German mathematician Bernhard Riemann, who first conceptualized them.

Formally, a Riemannian metric (or just a metric) on a smooth manifold is a choice of inner product for each tangent space of the manifold. A Riemannian manifold is a smooth manifold together with a Riemannian metric. The techniques of differential and integral calculus are used to pull geometric data out of the Riemannian metric. For example, integration leads to the Riemannian distance function, whereas differentiation is used to define curvature and parallel transport.

Any smooth surface in three-dimensional Euclidean space is a Riemannian manifold with a Riemannian metric coming from the way it sits inside the ambient space. The same is true for any submanifold of Euclidean space of any dimension. Although John Nash proved that every Riemannian manifold arises as a submanifold of Euclidean space, and although some Riemannian manifolds are naturally exhibited or defined in that way, the idea of a Riemannian manifold emphasizes the intrinsic point of view, which defines geometric notions directly on the abstract space itself without referencing an ambient space. In many instances, such as for hyperbolic space and projective space, Riemannian metrics are more naturally defined or constructed using the intrinsic point of view. Additionally, many metrics on Lie groups and homogeneous spaces are defined intrinsically by using group actions to transport an inner product on a single tangent space to the entire manifold, and many special metrics such as constant scalar curvature metrics and Kähler–Einstein metrics are constructed intrinsically using tools from partial differential equations.

Riemannian geometry, the study of Riemannian manifolds, has deep connections to other areas of math, including geometric topology, complex geometry, and algebraic geometry. Applications include physics (especially general relativity and gauge theory), computer graphics, machine learning, and cartography. Generalizations of Riemannian manifolds include pseudo-Riemannian manifolds, Finsler manifolds, and sub-Riemannian manifolds.

HistoryEdit

In 1827, Carl Friedrich Gauss discovered that the Gaussian curvature of a surface embedded in 3-dimensional space only depends on local measurements made within the surface (the first fundamental form).Template:Sfn This result is known as the Theorema Egregium ("remarkable theorem" in Latin).

A map that preserves the local measurements of a surface is called a local isometry. A property of a surface is called an intrinsic property if it is preserved by local isometries and it is called an extrinsic property if it is not. In this language, the Theorema Egregium says that the Gaussian curvature is an intrinsic property of surfaces.

Riemannian manifolds and their curvature were first introduced non-rigorously by Bernhard Riemann in 1854.Template:Sfn However, they would not be formalized until much later. In fact, the more primitive concept of a smooth manifold was first explicitly defined only in 1913 in a book by Hermann Weyl.Template:Sfn

Élie Cartan introduced the Cartan connection, one of the first concepts of a connection. Levi-Civita defined the Levi-Civita connection, a special connection on a Riemannian manifold.

Albert Einstein used the theory of pseudo-Riemannian manifolds (a generalization of Riemannian manifolds) to develop general relativity. Specifically, the Einstein field equations are constraints on the curvature of spacetime, which is a 4-dimensional pseudo-Riemannian manifold.

DefinitionEdit

Riemannian metrics and Riemannian manifoldsEdit

Let <math>M</math> be a smooth manifold. For each point <math>p \in M</math>, there is an associated vector space <math>T_pM</math> called the tangent space of <math>M</math> at <math>p</math>. Vectors in <math>T_pM</math> are thought of as the vectors tangent to <math>M</math> at <math>p</math>.

However, <math>T_pM</math> does not come equipped with an inner product, a "measuring stick" that gives tangent vectors a concept of length and angle. This is an important deficiency because calculus teaches that to calculate the length of a curve, the length of vectors tangent to the curve must be defined. A Riemannian metric puts such a "measuring stick" on every tangent space.

A Riemannian metric <math>g</math> on <math>M</math> assigns to each <math>p</math> a positive-definite bilinear form <math>g_p : T_pM \times T_pM \to \mathbb R</math> in a smooth way (see the section on regularity below).Template:Sfn This induces a norm <math> \|\cdot\|_p : T_pM \to \mathbb R</math> defined by <math>\|v\|_p = \sqrt{g_p(v,v)}</math>. A smooth manifold <math>M</math> endowed with a Riemannian metric <math>g</math> is a Riemannian manifold, denoted <math>(M,g)</math>.Template:Sfn A Riemannian metric is a special case of a metric tensor.

A Riemannian metric is not to be confused with the distance function of a metric space, which is also called a metric.

The Riemannian metric in coordinatesEdit

If <math>(x^1,\ldots,x^n):U\to\mathbb{R}^n</math> are smooth local coordinates on <math>M</math>, the vectors

<math>\left\{\frac{\partial}{\partial x^1}\Big|_p,\dotsc, \frac{\partial}{\partial x^n}\Big|_p\right\}</math>

form a basis of the vector space <math>T_pM</math> for any <math>p\in U</math>. Relative to this basis, one can define the Riemannian metric's components at each point <math>p</math> by

<math>g_{ij}|_p:=g_p\left(\left.\frac{\partial }{\partial x^i}\right|_p,\left.\frac{\partial }{\partial x^j}\right|_p\right)</math>.Template:Sfn

These <math>n^2</math> functions <math>g_{ij}:U\to\mathbb{R}</math> can be put together into an <math>n\times n</math> matrix-valued function on <math>U</math>. The requirement that <math>g_p</math> is a positive-definite inner product then says exactly that this matrix-valued function is a symmetric positive-definite matrix at <math>p</math>.

In terms of the tensor algebra, the Riemannian metric can be written in terms of the dual basis <math>\{ dx^1, \ldots, dx^n \}</math> of the cotangent bundle as

<math> g=\sum_{i,j}g_{ij} \, dx^i \otimes dx^j.</math>Template:Sfn

Regularity of the Riemannian metricEdit

The Riemannian metric <math>g</math> is continuous if its components <math>g_{ij}:U\to\mathbb{R}</math> are continuous in any smooth coordinate chart <math>(U,x).</math> The Riemannian metric <math>g</math> is smooth if its components <math>g_{ij}</math> are smooth in any smooth coordinate chart. One can consider many other types of Riemannian metrics in this spirit, such as Lipschitz Riemannian metrics or measurable Riemannian metrics.

There are situations in geometric analysis in which one wants to consider non-smooth Riemannian metrics. See for instance (Gromov 1999) and (Shi and Tam 2002). However, in this article, <math>g</math> is assumed to be smooth unless stated otherwise.

Musical isomorphismEdit

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In analogy to how an inner product on a vector space induces an isomorphism between a vector space and its dual given by <math>v \mapsto \langle v, \cdot \rangle</math>, a Riemannian metric induces an isomorphism of bundles between the tangent bundle and the cotangent bundle. Namely, if <math>g</math> is a Riemannian metric, then

<math>(p,v) \mapsto g_p(v,\cdot)</math>

is a isomorphism of smooth vector bundles from the tangent bundle <math>TM</math> to the cotangent bundle <math>T^*M</math>.Template:Sfn

IsometriesEdit

An isometry is a function between Riemannian manifolds which preserves all of the structure of Riemannian manifolds. If two Riemannian manifolds have an isometry between them, they are called isometric, and they are considered to be the same manifold for the purpose of Riemannian geometry.

Specifically, if <math>(M,g)</math> and <math>(N,h)</math> are two Riemannian manifolds, a diffeomorphism <math>f:M\to N</math> is called an isometry if <math>g=f^\ast h</math>,Template:Sfn that is, if

<math>g_p(u,v)=h_{f(p)}(df_p(u),df_p(v))</math>

for all <math>p\in M</math> and <math>u,v\in T_pM.</math> For example, translations and rotations are both isometries from Euclidean space (to be defined soon) to itself.

One says that a smooth map <math>f:M\to N,</math> not assumed to be a diffeomorphism, is a local isometry if every <math>p\in M</math> has an open neighborhood <math>U</math> such that <math>f:U\to f(U)</math> is an isometry (and thus a diffeomorphism).Template:Sfn

VolumeEdit

An oriented <math>n</math>-dimensional Riemannian manifold <math>(M,g)</math> has a unique <math>n</math>-form <math>dV_g</math> called the Riemannian volume form.Template:Sfn The Riemannian volume form is preserved by orientation-preserving isometries.Template:Sfn The volume form gives rise to a measure on <math>M</math> which allows measurable functions to be integrated.Template:Citation needed If <math>M</math> is compact, the volume of <math>M</math> is <math>\int_M dV_g</math>.Template:Sfn

ExamplesEdit

Euclidean spaceEdit

Let <math>x^1,\ldots,x^n</math> denote the standard coordinates on <math>\mathbb{R}^n.</math> The (canonical) Euclidean metric <math>g^\text{can}</math> is given byTemplate:Sfn

<math>g^\text{can}\left(\sum_i a_i \frac{\partial}{\partial x^i}, \sum_j b_j \frac{\partial}{\partial x^j} \right) = \sum_i a_i b_i</math>

or equivalently

<math>g^\text{can} = (dx^1)^2 + \cdots + (dx^n)^2</math>

or equivalently by its coordinate functions

<math>g_{ij}^\text{can} = \delta_{ij}</math> where <math>\delta_{ij}</math> is the Kronecker delta

which together form the matrix

<math>(g_{ij}^\text{can}) = \begin{pmatrix}

1 & 0 & \cdots & 0 \\ 0 & 1 & \cdots & 0 \\ \vdots & \vdots & \ddots & \vdots \\ 0 & 0 & \cdots & 1 \end{pmatrix}.</math> The Riemannian manifold <math>(\mathbb{R}^n,g^\text{can})</math> is called Euclidean space.

SubmanifoldsEdit

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Let <math>(M,g)</math> be a Riemannian manifold and let <math>i : N \to M</math> be an immersed submanifold or an embedded submanifold of <math>M</math>. The pullback <math>i^*g</math> of <math>g</math> is a Riemannian metric on <math>N</math>, and <math>(N, i^*g)</math> is said to be a Riemannian submanifold of <math>(M,g)</math>.Template:Sfn

In the case where <math>N \subseteq M</math>, the map <math>i : N \to M</math> is given by <math>i(x) = x</math> and the metric <math>i^*g</math> is just the restriction of <math>g</math> to vectors tangent along <math>N</math>. In general, the formula for <math>i^*g</math> is

<math>i^*g_p(v,w) = g_{i(p)} \big( di_p(v), di_p(w) \big), </math>

where <math>di_p(v)</math> is the pushforward of <math>v</math> by <math>i.</math>

Examples:

• The <math>n</math>-sphere

  <math>S^n=\{x\in\mathbb{R}^{n+1}:(x^1)^2+\cdots+(x^{n+1})^2=1\}</math>

is a smooth embedded submanifold of Euclidean space <math>\mathbb R^{n+1}</math>.Template:Sfn The Riemannian metric this induces on <math>S^n</math> is called the round metric or standard metric.

• Fix real numbers <math>a,b,c</math>. The ellipsoid

  <math>\left\{(x,y,z) \in \mathbb R^3 : \frac{x^2}{a^2} + \frac{y^2}{b^2} + \frac{z^2}{c^2} = 1 \right\}</math>

is a smooth embedded submanifold of Euclidean space <math>\mathbb R^3</math>.

• The graph of a smooth function <math>f:\mathbb{R}^n\to\mathbb{R}</math> is a smooth embedded submanifold of <math>\mathbb{R}^{n+1}</math> with its standard metric.
• If <math>(M,g)</math> is not simply connected, there is a covering map <math>\widetilde{M}\to M</math>, where <math>\widetilde M</math> is the universal cover of <math>M</math>. This is an immersion (since it is locally a diffeomorphism), so <math>\widetilde M</math> automatically inherits a Riemannian metric. By the same principle, any smooth covering space of a Riemannian manifold inherits a Riemannian metric.

On the other hand, if <math>N</math> already has a Riemannian metric <math>\tilde g</math>, then the immersion (or embedding) <math>i : N \to M</math> is called an isometric immersion (or isometric embedding) if <math>\tilde g = i^* g</math>. Hence isometric immersions and isometric embeddings are Riemannian submanifolds.Template:Sfn

ProductsEdit

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Let <math>(M,g)</math> and <math>(N,h)</math> be two Riemannian manifolds, and consider the product manifold <math>M\times N</math>. The Riemannian metrics <math>g</math> and <math>h</math> naturally put a Riemannian metric <math>\widetilde{g}</math> on <math>M\times N,</math> which can be described in a few ways.

• Considering the decomposition <math>T_{(p,q)}(M\times N) \cong T_pM \oplus T_qN,</math> one may define

  <math>\widetilde{g}_{p,q} ((u_1, u_2), (v_1, v_2)) = g_p(u_1, v_1) + h_q(u_2, v_2).</math>Template:Sfn

• If <math>(U,x)</math> is a smooth coordinate chart on <math>M</math> and <math>(V,y)</math> is a smooth coordinate chart on <math>N</math>, then <math>(U \times V, (x,y))</math> is a smooth coordinate chart on <math>M \times N.</math> Let <math>g_U</math> be the representation of <math>g</math> in the chart <math>(U,x)</math> and let <math>h_V</math> be the representation of <math>h</math> in the chart <math>(V,y)</math>. The representation of <math>\widetilde{g}</math> in the coordinates <math>(U \times V,(x,y))</math> is

  <math>\widetilde{g} = \sum_{ij} \widetilde{g}_{ij} \, dx^i \, dx^j</math> where <math>(\widetilde{g}_{ij}) = \begin{pmatrix} g_U & 0 \\ 0 & h_V \end{pmatrix}.</math>Template:Sfn

For example, consider the <math>n</math>-torus <math>T^n = S^1\times\cdots\times S^1</math>. If each copy of <math>S^1</math> is given the round metric, the product Riemannian manifold <math>T^n</math> is called the flat torus. As another example, the Riemannian product <math>\mathbb R \times \cdots \times \mathbb R</math>, where each copy of <math>\mathbb R</math> has the Euclidean metric, is isometric to <math>\mathbb R^n</math> with the Euclidean metric.

Positive combinations of metricsEdit

Let <math>g_1, \ldots, g_k</math> be Riemannian metrics on <math>M.</math> If <math>f_1, \ldots, f_k</math> are any positive smooth functions on <math>M</math>, then <math>f_1 g_1 + \ldots + f_k g_k</math> is another Riemannian metric on <math>M.</math>

Every smooth manifold admits a Riemannian metricEdit

Theorem: Every smooth manifold admits a (non-canonical) Riemannian metric.Template:Sfn

This is a fundamental result. Although much of the basic theory of Riemannian metrics can be developed using only that a smooth manifold is a locally Euclidean topological space, for this result it is necessary to use that smooth manifolds are Hausdorff and paracompact. The reason is that the proof makes use of a partition of unity.

Template:Collapse top Let <math> M</math> be a smooth manifold and <math>\{(U_\alpha,\varphi_\alpha)\}_{\alpha \in A}</math> a locally finite atlas so that <math>U_\alpha \subseteq M</math> are open subsets and <math>\varphi_\alpha \colon U_\alpha\to \varphi_\alpha(U_\alpha)\subseteq\mathbf{R}^n</math> are diffeomorphisms. Such an atlas exists because the manifold is paracompact.

Let <math>\{\tau_\alpha\}_{\alpha \in A}</math> be a differentiable partition of unity subordinate to the given atlas, i.e. such that <math>\operatorname{supp}( \tau_\alpha) \subseteq U_\alpha</math> for all <math> \alpha \in A</math>.

Define a Riemannian metric <math>g</math> on <math>M</math> by

<math>g = \sum_{\alpha \in A} \tau_\alpha \cdot \tilde{g}_\alpha</math>

where

<math>\tilde{g}_\alpha = \varphi_\alpha^* g^{\text{can}}.</math>

Here <math>g^\text{can}</math> is the Euclidean metric on <math>\mathbb R^n</math> and <math>\varphi_\alpha^*g^{\mathrm{can}}</math> is its pullback along <math>\varphi_\alpha</math>. While <math>\tilde{g}_\alpha</math> is only defined on <math>U_\alpha</math>, the product <math>\tau_\alpha \cdot \tilde{g}_\alpha</math> is defined and smooth on <math>M</math> since <math>\operatorname{supp}( \tau_\alpha) \subseteq U_\alpha</math>. It takes the value 0 outside of <math>U_\alpha</math>. Because the atlas is locally finite, at every point the sum contains only finitely many nonzero terms, so the sum converges. It is straightforward to check that <math>g</math> is a Riemannian metric. Template:Collapse bottom

An alternative proof uses the Whitney embedding theorem to embed <math>M</math> into Euclidean space and then pulls back the metric from Euclidean space to <math>M</math>. On the other hand, the Nash embedding theorem states that, given any smooth Riemannian manifold <math>(M,g),</math> there is an embedding <math>F:M\to\mathbb{R}^N</math> for some <math>N</math> such that the pullback by <math>F</math> of the standard Riemannian metric on <math>\mathbb{R}^N</math> is <math>g.</math> That is, the entire structure of a smooth Riemannian manifold can be encoded by a diffeomorphism to a certain embedded submanifold of some Euclidean space. Therefore, one could argue that nothing can be gained from the consideration of abstract smooth manifolds and their Riemannian metrics. However, there are many natural smooth Riemannian manifolds, such as the set of rotations of three-dimensional space and hyperbolic space, of which any representation as a submanifold of Euclidean space will fail to represent their remarkable symmetries and properties as clearly as their abstract presentations do.

Metric space structureEdit

An admissible curve is a piecewise smooth curve <math>\gamma : [0,1] \to M</math> whose velocity <math>\gamma'(t) \in T_{\gamma(t)}M</math> is nonzero everywhere it is defined. The nonnegative function <math>t\mapsto\|\gamma'(t)\|_{\gamma(t)}</math> is defined on the interval <math>[0,1]</math> except for at finitely many points. The length <math>L(\gamma)</math> of an admissible curve <math>\gamma : [0,1] \to M</math> is defined as

<math>L(\gamma)=\int_0^1 \|\gamma'(t)\|_{\gamma(t)} \, dt.</math>

The integrand is bounded and continuous except at finitely many points, so it is integrable. For <math>(M,g)</math> a connected Riemannian manifold, define <math>d_g:M\times M\to[0,\infty)</math> by

<math>d_g(p,q) = \inf \{ L(\gamma) : \gamma \text{ an admissible curve with } \gamma(0) = p, \gamma(1) = q \}.</math>

Theorem: <math>(M,d_g)</math> is a metric space, and the metric topology on <math>(M,d_g)</math> coincides with the topology on <math>M</math>.Template:Sfn

Template:Collapse top In verifying that <math>(M,d_g)</math> satisfies all of the axioms of a metric space, the most difficult part is checking that <math>p\neq q</math> implies <math>d_g(p,q)>0</math>. Verification of the other metric space axioms is omitted.

There must be some precompact open set around p which every curve from p to q must escape. By selecting this open set to be contained in a coordinate chart, one can reduce the claim to the well-known fact that, in Euclidean geometry, the shortest curve between two points is a line. In particular, as seen by the Euclidean geometry of a coordinate chart around p, any curve from p to q must first pass though a certain "inner radius." The assumed continuity of the Riemannian metric g only allows this "coordinate chart geometry" to distort the "true geometry" by some bounded factor.

To be precise, let <math>(U,x)</math> be a smooth coordinate chart with <math>x(p)=0</math> and <math>q\notin U.</math> Let <math>V\ni x</math> be an open subset of <math>U</math> with <math>\overline{V}\subset U.</math> By continuity of <math>g</math> and compactness of <math>\overline{V},</math> there is a positive number <math>\lambda</math> such that <math>g(X,X)\geq\lambda\|X\|^2</math> for any <math>r\in V</math> and any <math>X\in T_rM,</math> where <math>\|\cdot\|</math> denotes the Euclidean norm induced by the local coordinates. Let R denote <math>\sup\{r>0:B_r(0)\subset x(V)\}</math>. Now, given any admissible curve <math>\gamma:[0,1]\to M</math> from p to q, there must be some minimal <math>\delta>0</math> such that <math>\gamma(\delta)\notin V;</math> clearly <math>\gamma(\delta)\in\partial V.</math>

The length of <math>\gamma</math> is at least as large as the restriction of <math>\gamma</math> to <math>[0,\delta].</math> So

<math>L(\gamma)\geq\sqrt{\lambda}\int_0^\delta\|\gamma'(t)\|\,dt.</math>

The integral which appears here represents the Euclidean length of a curve from 0 to <math>x(\partial V)\subset\mathbb{R}^n</math>, and so it is greater than or equal to R. So we conclude <math>L(\gamma)\geq\sqrt{\lambda}R.</math>

The observation about comparison between lengths measured by g and Euclidean lengths measured in a smooth coordinate chart, also verifies that the metric space topology of <math>(M,d_g)</math> coincides with the original topological space structure of <math>M</math>. Template:Collapse bottom

Although the length of a curve is given by an explicit formula, it is generally impossible to write out the distance function <math>d_g</math> by any explicit means. In fact, if <math>M</math> is compact, there always exist points where <math>d_g:M\times M\to\mathbb{R}</math> is non-differentiable, and it can be remarkably difficult to even determine the location or nature of these points, even in seemingly simple cases such as when <math>(M,g)</math> is an ellipsoid.Template:Citation needed

If one works with Riemannian metrics that are merely continuous but possibly not smooth, the length of an admissible curve and the Riemannian distance function are defined exactly the same, and, as before, <math>(M,d_g)</math> is a metric space and the metric topology on <math>(M,d_g)</math> coincides with the topology on <math>M</math>.Template:Sfn

DiameterEdit

The diameter of the metric space <math>(M,d_g)</math> is

<math>\operatorname{diam}(M,d_g)=\sup\{d_g(p,q):p,q\in M\}.</math>

The Hopf–Rinow theorem shows that if <math>(M,d_g)</math> is complete and has finite diameter, it is compact. Conversely, if <math>(M,d_g)</math> is compact, then the function <math>d_g:M\times M\to\mathbb{R}</math> has a maximum, since it is a continuous function on a compact metric space. This proves the following.

If <math>(M,d_g)</math> is complete, then it is compact if and only if it has finite diameter.

This is not the case without the completeness assumption; for counterexamples one could consider any open bounded subset of a Euclidean space with the standard Riemannian metric. It is also not true that any complete metric space of finite diameter must be compact; it matters that the metric space came from a Riemannian manifold.

Connections, geodesics, and curvatureEdit

ConnectionsEdit

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An (affine) connection is an additional structure on a Riemannian manifold that defines differentiation of one vector field with respect to another. Connections contain geometric data, and two Riemannian manifolds with different connections have different geometry.

Let <math>\mathfrak X(M)</math> denote the space of vector fields on <math>M</math>. An (affine) connection

<math>\nabla : \mathfrak X(M) \times \mathfrak X(M) \to \mathfrak X(M)</math>

on <math>M</math> is a bilinear map <math>(X,Y) \mapsto \nabla_X Y</math> such that

1. For every function <math>f \in C^\infty(M)</math>, <math>\nabla_{f_1 X_1 + f_2 X_2} Y = f_1 \,\nabla_{X_1} Y + f_2 \, \nabla_{X_2} Y, </math>
2. The product rule <math>\nabla_X fY=X(f)Y+ f\,\nabla_X Y</math> holds.Template:Sfn

The expression <math>\nabla_X Y</math> is called the covariant derivative of <math>Y</math> with respect to <math>X</math>.

Levi-Civita connectionEdit

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Two Riemannian manifolds with different connections have different geometry. Thankfully, there is a natural connection associated to a Riemannian manifold called the Levi-Civita connection.

A connection <math>\nabla</math> is said to preserve the metric if

<math>X\bigl(g(Y,Z)\bigr) = g(\nabla_X Y, Z) + g(Y, \nabla_X Z)</math>

A connection <math>\nabla</math> is torsion-free if

<math>\nabla_X Y - \nabla_Y X = [X,Y], </math>

where <math>[\cdot,\cdot]</math> is the Lie bracket.

A Levi-Civita connection is a torsion-free connection that preserves the metric. Once a Riemannian metric is fixed, there exists a unique Levi-Civita connection.Template:Sfn Note that the definition of preserving the metric uses the regularity of <math>g</math>.

Covariant derivative along a curveEdit

If <math>\gamma : [0,1] \to M</math> is a smooth curve, a smooth vector field along <math>\gamma</math> is a smooth map <math>X : [0,1] \to TM</math> such that <math>X(t) \in T_{\gamma(t)}M</math> for all <math>t \in [0,1]</math>. The set <math>\mathfrak X(\gamma)</math> of smooth vector fields along <math>\gamma</math> is a vector space under pointwise vector addition and scalar multiplication.Template:Sfn One can also pointwise multiply a smooth vector field along <math>\gamma</math> by a smooth function <math>f : [0,1] \to \mathbb R</math>:

<math>(fX)(t) = f(t)X(t)</math> for <math>X \in \mathfrak X(\gamma).</math>

Let <math>X</math> be a smooth vector field along <math>\gamma</math>. If <math>\tilde X</math> is a smooth vector field on a neighborhood of the image of <math>\gamma</math> such that <math>X(t) = \tilde X_{\gamma(t)}</math>, then <math>\tilde X</math> is called an extension of <math>X</math>.

Given a fixed connection <math>\nabla</math> on <math>M</math> and a smooth curve <math>\gamma : [0,1] \to M</math>, there is a unique operator <math>D_t : \mathfrak X(\gamma) \to \mathfrak X(\gamma)</math>, called the covariant derivative along <math>\gamma</math>, such that:Template:Sfn

1. <math>D_t(aX+bY) = a\,D_tX + b\,D_tY,</math>
2. <math>D_t(fX) = f'X + f\,D_tX,</math>
3. If <math>\tilde X</math> is an extension of <math>X</math>, then <math>D_tX(t) = \nabla_{\gamma'(t)} \tilde X</math>.

GeodesicsEdit

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Geodesics are curves with no intrinsic acceleration. Equivalently, geodesics are curves that locally take the shortest path between two points. They are the generalization of straight lines in Euclidean space to arbitrary Riemannian manifolds. An ant living in a Riemannian manifold walking straight ahead without making any effort to accelerate or turn would trace out a geodesic.

Fix a connection <math>\nabla</math> on <math>M</math>. Let <math>\gamma : [0,1] \to M</math> be a smooth curve. The acceleration of <math>\gamma</math> is the vector field <math>D_t\gamma'</math> along <math>\gamma</math>. If <math>D_t\gamma' = 0</math> for all <math>t</math>, <math>\gamma</math> is called a geodesic.Template:Sfn

For every <math>p \in M</math> and <math>v \in T_pM</math>, there exists a geodesic <math>\gamma : I \to M</math> defined on some open interval <math>I</math> containing 0 such that <math>\gamma(0) = p</math> and <math>\gamma'(0) = v</math>. Any two such geodesics agree on their common domain.Template:Sfn Taking the union over all open intervals <math>I</math> containing 0 on which a geodesic satisfying <math>\gamma(0) = p</math> and <math>\gamma'(0) = v</math> exists, one obtains a geodesic called a maximal geodesic of which every geodesic satisfying <math>\gamma(0) = p</math> and <math>\gamma'(0) = v</math> is a restriction.Template:Sfn

Every curve <math>\gamma : [0,1] \to M</math> that has the shortest length of any admissible curve with the same endpoints as <math>\gamma</math> is a geodesic (in a unit-speed reparameterization).Template:Sfn

ExamplesEdit

• The nonconstant maximal geodesics of the Euclidean plane <math>\mathbb R^2</math> are exactly the straight lines.Template:Sfn This agrees with the fact from Euclidean geometry that the shortest path between two points is a straight line segment.
• The nonconstant maximal geodesics of <math>S^2</math> with the round metric are exactly the great circles.Template:Sfn Since the Earth is approximately a sphere, this means that the shortest path a plane can fly between two locations on Earth is a segment of a great circle.

Hopf–Rinow theoremEdit

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The Riemannian manifold <math>M</math> with its Levi-Civita connection is geodesically complete if the domain of every maximal geodesic is <math>(-\infty,\infty)</math>.Template:Sfn The plane <math>\mathbb R^2</math> is geodesically complete. On the other hand, the punctured plane <math>\mathbb{R}^2\smallsetminus\{(0,0)\}</math> with the restriction of the Riemannian metric from <math>\mathbb R^2</math> is not geodesically complete as the maximal geodesic with initial conditions <math>p = (1,1)</math>, <math>v = (1,1)</math> does not have domain <math>\mathbb R</math>.

The Hopf–Rinow theorem characterizes geodesically complete manifolds.

Theorem: Let <math>(M,g)</math> be a connected Riemannian manifold. The following are equivalent:Template:Sfn

• The metric space <math>(M,d_g)</math> is complete (every <math>d_g</math>-Cauchy sequence converges),
• All closed and bounded subsets of <math>M</math> are compact,
• <math>M</math> is geodesically complete.

Parallel transportEdit

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In Euclidean space, all tangent spaces are canonically identified with each other via translation, so it is easy to move vectors from one tangent space to another. Parallel transport is a way of moving vectors from one tangent space to another along a curve in the setting of a general Riemannian manifold. Given a fixed connection, there is a unique way to do parallel transport.Template:Sfn

Specifically, call a smooth vector field <math>V</math> along a smooth curve <math>\gamma</math> parallel along <math>\gamma</math> if <math>D_t V = 0</math> identically.Template:Sfn Fix a curve <math>\gamma : [0,1] \to M</math> with <math>\gamma(0) = p</math> and <math>\gamma(1) = q</math>. to parallel transport a vector <math>v \in T_pM</math> to a vector in <math>T_qM</math> along <math>\gamma</math>, first extend <math>v</math> to a vector field parallel along <math>\gamma</math>, and then take the value of this vector field at <math>q</math>.

The images below show parallel transport induced by the Levi-Civita connection associated to two different Riemannian metrics on the punctured plane <math>\mathbb R^2 \smallsetminus \{0,0\}</math>. The curve the parallel transport is done along is the unit circle. In polar coordinates, the metric on the left is the standard Euclidean metric <math>dx^2 + dy^2 = dr^2 + r^2 \, d\theta^2</math>, while the metric on the right is <math>dr^2 + d\theta^2</math>. This second metric has a singularity at the origin, so it does not extend past the puncture, but the first metric extends to the entire plane.

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Warning: This is parallel transport on the punctured plane along the unit circle, not parallel transport on the unit circle. Indeed, in the first image, the vectors fall outside of the tangent space to the unit circle.

Riemann curvature tensorEdit

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The Riemann curvature tensor measures precisely the extent to which parallel transporting vectors around a small rectangle is not the identity map.Template:Sfn The Riemann curvature tensor is 0 at every point if and only if the manifold is locally isometric to Euclidean space.Template:Sfn

Fix a connection <math>\nabla</math> on <math>M</math>. The Riemann curvature tensor is the map <math>R : \mathfrak X(M) \times \mathfrak X(M) \times \mathfrak X(M) \to \mathfrak X(M)</math> defined by

<math>R(X, Y)Z = \nabla_X\nabla_Y Z - \nabla_Y \nabla_X Z - \nabla_{[X, Y]} Z</math>

where <math>[X, Y]</math> is the Lie bracket of vector fields. The Riemann curvature tensor is a <math>(1,3)</math>-tensor field.Template:Sfn

Ricci curvature tensorEdit

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Fix a connection <math>\nabla</math> on <math>M</math>. The Ricci curvature tensor is

<math>Ric(X,Y) = \operatorname{tr}(Z \mapsto R(Z,X)Y)</math>

where <math>\operatorname{tr}</math> is the trace. The Ricci curvature tensor is a covariant 2-tensor field.Template:Sfn

Einstein manifoldsEdit

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The Ricci curvature tensor <math>Ric</math> plays a defining role in the theory of Einstein manifolds, which has applications to the study of gravity. A (pseudo-)Riemannian metric <math>g</math> is called an Einstein metric if Einstein's equation

<math>Ric = \lambda g</math> for some constant <math>\lambda</math>

holds, and a (pseudo-)Riemannian manifold whose metric is Einstein is called an Einstein manifold.Template:Sfn Examples of Einstein manifolds include Euclidean space, the <math>n</math>-sphere, hyperbolic space, and complex projective space with the Fubini-Study metric.

Scalar curvatureEdit

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Constant curvature and space formsEdit

A Riemannian manifold is said to have constant curvature Template:Mvar if every sectional curvature equals the number Template:Mvar. This is equivalent to the condition that, relative to any coordinate chart, the Riemann curvature tensor can be expressed in terms of the metric tensor as

<math>R_{ijkl}=\kappa(g_{il}g_{jk}-g_{ik}g_{jl}).</math>

This implies that the Ricci curvature is given by Template:Math and the scalar curvature is Template:Math, where Template:Mvar is the dimension of the manifold. In particular, every Riemannian manifold of constant curvature is an Einstein manifold, thereby having constant scalar curvature. As found by Bernhard Riemann in his 1854 lecture introducing Riemannian geometry, the locally-defined Riemannian metric

<math>\frac{dx_1^2+\cdots+dx_n^2}{(1+\frac{\kappa}{4}(x_1^2+\cdots+x_n^2))^2}</math>

has constant curvature Template:Mvar. Any two Riemannian manifolds of the same constant curvature are locally isometric, and so it follows that any Riemannian manifold of constant curvature Template:Mvar can be covered by coordinate charts relative to which the metric has the above form.Template:Sfnm

A Riemannian space form is a Riemannian manifold with constant curvature which is additionally connected and geodesically complete. A Riemannian space form is said to be a spherical space form if the curvature is positive, a Euclidean space form if the curvature is zero, and a hyperbolic space form or hyperbolic manifold if the curvature is negative. In any dimension, the sphere with its standard Riemannian metric, Euclidean space, and hyperbolic space are Riemannian space forms of constant curvature Template:Math, Template:Math, and Template:Math respectively. Furthermore, the Killing–Hopf theorem says that any simply-connected spherical space form is homothetic to the sphere, any simply-connected Euclidean space form is homothetic to Euclidean space, and any simply-connected hyperbolic space form is homothetic to hyperbolic space.Template:Sfnm

Using the covering manifold construction, any Riemannian space form is isometric to the quotient manifold of a simply-connected Riemannian space form, modulo a certain group action of isometries. For example, the isometry group of the Template:Mvar-sphere is the orthogonal group Template:Math. Given any finite subgroup Template:Mvar thereof in which only the identity matrix possesses Template:Math as an eigenvalue, the natural group action of the orthogonal group on the Template:Mvar-sphere restricts to a group action of Template:Mvar, with the quotient manifold Template:Math inheriting a geodesically complete Riemannian metric of constant curvature Template:Math. Up to homothety, every spherical space form arises in this way; this largely reduces the study of spherical space forms to problems in group theory. For instance, this can be used to show directly that every even-dimensional spherical space form is homothetic to the standard metric on either the sphere or real projective space. There are many more odd-dimensional spherical space forms, although there are known algorithms for their classification. The list of three-dimensional spherical space forms is infinite but explicitly known, and includes the lens spaces and the Poincaré dodecahedral space.Template:Sfnm

The case of Euclidean and hyperbolic space forms can likewise be reduced to group theory, based on study of the isometry group of Euclidean space and hyperbolic space. For example, the class of two-dimensional Euclidean space forms includes Riemannian metrics on the Klein bottle, the Möbius strip, the torus, the cylinder Template:Math, along with the Euclidean plane. Unlike the case of two-dimensional spherical space forms, in some cases two space form structures on the same manifold are not homothetic. The case of two-dimensional hyperbolic space forms is even more complicated, having to do with Teichmüller space. In three dimensions, the Euclidean space forms are known, while the geometry of hyperbolic space forms in three and higher dimensions remains an area of active research known as hyperbolic geometry.Template:Sfnm

Riemannian metrics on Lie groupsEdit

Left-invariant metrics on Lie groupsEdit

Let Template:Mvar be a Lie group, such as the group of rotations in three-dimensional space. Using the group structure, any inner product on the tangent space at the identity (or any other particular tangent space) can be transported to all other tangent spaces to define a Riemannian metric. Formally, given an inner product Template:Math on the tangent space at the identity, the inner product on the tangent space at an arbitrary point Template:Mvar is defined by

<math>g_p(u,v)=g_e(dL_{p^{-1}}(u),dL_{p^{-1}}(v)),</math>

where for arbitrary Template:Mvar, Template:Math is the left multiplication map Template:Math sending a point Template:Mvar to Template:Math. Riemannian metrics constructed this way are left-invariant; right-invariant Riemannian metrics could be constructed likewise using the right multiplication map instead.

The Levi-Civita connection and curvature of a general left-invariant Riemannian metric can be computed explicitly in terms of Template:Math, the adjoint representation of Template:Mvar, and the Lie algebra associated to Template:Mvar.Template:Sfnm These formulas simplify considerably in the special case of a Riemannian metric which is bi-invariant (that is, simultaneously left- and right-invariant).Template:Sfnm All left-invariant metrics have constant scalar curvature.

Left- and bi-invariant metrics on Lie groups are an important source of examples of Riemannian manifolds. Berger spheres, constructed as left-invariant metrics on the special unitary group SU(2), are among the simplest examples of the collapsing phenomena, in which a simply-connected Riemannian manifold can have small volume without having large curvature.Template:Sfnm They also give an example of a Riemannian metric which has constant scalar curvature but which is not Einstein, or even of parallel Ricci curvature.Template:Sfnm Hyperbolic space can be given a Lie group structure relative to which the metric is left-invariant.<ref>In the upper half-space model of hyperbolic space, the Lie group structure is defined by <math>(x_1,\ldots,x_n)\cdot(y_1,\ldots,y_n)=(x_1+y_nx_1,\ldots,x_{n-1}+y_nx_{n-1},x_ny_n).</math></ref>Template:Sfnm Any bi-invariant Riemannian metric on a Lie group has nonnegative sectional curvature, giving a variety of such metrics: a Lie group can be given a bi-invariant Riemannian metric if and only if it is the product of a compact Lie group with an abelian Lie group.Template:Sfnm

Homogeneous spacesEdit

A Riemannian manifold Template:Math is said to be homogeneous if for every pair of points Template:Mvar and Template:Mvar in Template:Mvar, there is some isometry Template:Mvar of the Riemannian manifold sending Template:Mvar to Template:Mvar. This can be rephrased in the language of group actions as the requirement that the natural action of the isometry group is transitive. Every homogeneous Riemannian manifold is geodesically complete and has constant scalar curvature.Template:Sfnm

Up to isometry, all homogeneous Riemannian manifolds arise by the following construction. Given a Lie group Template:Mvar with compact subgroup Template:Mvar which does not contain any nontrivial normal subgroup of Template:Mvar, fix any complemented subspace Template:Mvar of the Lie algebra of Template:Mvar within the Lie algebra of Template:Mvar. If this subspace is invariant under the linear map Template:Math for any element Template:Mvar of Template:Mvar, then Template:Mvar-invariant Riemannian metrics on the coset space Template:Math are in one-to-one correspondence with those inner products on Template:Mvar which are invariant under Template:Math for every element Template:Mvar of Template:Mvar.Template:Sfnm Each such Riemannian metric is homogeneous, with Template:Mvar naturally viewed as a subgroup of the full isometry group.

The above example of Lie groups with left-invariant Riemannian metrics arises as a very special case of this construction, namely when Template:Mvar is the trivial subgroup containing only the identity element. The calculations of the Levi-Civita connection and the curvature referenced there can be generalized to this context, where now the computations are formulated in terms of the inner product on Template:Mvar, the Lie algebra of Template:Mvar, and the direct sum decomposition of the Lie algebra of Template:Mvar into the Lie algebra of Template:Mvar and Template:Mvar.Template:Sfnm This reduces the study of the curvature of homogeneous Riemannian manifolds largely to algebraic problems. This reduction, together with the flexibility of the above construction, makes the class of homogeneous Riemannian manifolds very useful for constructing examples.

Symmetric spacesEdit

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A connected Riemannian manifold Template:Math is said to be symmetric if for every point Template:Mvar of Template:Mvar there exists some isometry of the manifold with Template:Mvar as a fixed point and for which the negation of the differential at Template:Mvar is the identity map. Every Riemannian symmetric space is homogeneous, and consequently is geodesically complete and has constant scalar curvature. However, Riemannian symmetric spaces also have a much stronger curvature property not possessed by most homogeneous Riemannian manifolds, namely that the Riemann curvature tensor and Ricci curvature are parallel. Riemannian manifolds with this curvature property, which could loosely be phrased as "constant Riemann curvature tensor" (not to be confused with constant curvature), are said to be locally symmetric. This property nearly characterizes symmetric spaces; Élie Cartan proved in the 1920s that a locally symmetric Riemannian manifold which is geodesically complete and simply-connected must in fact be symmetric.Template:Sfnm

Many of the fundamental examples of Riemannian manifolds are symmetric. The most basic include the sphere and real projective spaces with their standard metrics, along with hyperbolic space. The complex projective space, quaternionic projective space, and Cayley plane are analogues of the real projective space which are also symmetric, as are complex hyperbolic space, quaternionic hyperbolic space, and Cayley hyperbolic space, which are instead analogues of hyperbolic space. Grassmannian manifolds also carry natural Riemannian metrics making them into symmetric spaces. Among the Lie groups with left-invariant Riemannian metrics, those which are bi-invariant are symmetric.Template:Sfnm

Based on their algebraic formulation as special kinds of homogeneous spaces, Cartan achieved an explicit classification of symmetric spaces which are irreducible, referring to those which cannot be locally decomposed as product spaces. Every such space is an example of an Einstein manifold; among them only the one-dimensional manifolds have zero scalar curvature. These spaces are important from the perspective of Riemannian holonomy. As found in the 1950s by Marcel Berger, any Riemannian manifold which is simply-connected and irreducible is either a symmetric space or has Riemannian holonomy belonging to a list of only seven possibilities. Six of the seven exceptions to symmetric spaces in Berger's classification fall into the fields of Kähler geometry, quaternion-Kähler geometry, G₂ geometry, and Spin(7) geometry, each of which study Riemannian manifolds equipped with certain extra structures and symmetries. The seventh exception is the study of 'generic' Riemannian manifolds with no particular symmetry, as reflected by the maximal possible holonomy group.Template:Sfnm

Infinite-dimensional manifoldsEdit

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The statements and theorems above are for finite-dimensional manifolds—manifolds whose charts map to open subsets of <math>\R^n.</math> These can be extended, to a certain degree, to infinite-dimensional manifolds; that is, manifolds that are modeled after a topological vector space; for example, Fréchet, Banach, and Hilbert manifolds.

DefinitionsEdit

Riemannian metrics are defined in a way similar to the finite-dimensional case. However, there is a distinction between two types of Riemannian metrics:

• A weak Riemannian metric on <math>M</math> is a smooth function <math>g : TM \times TM \to \R,</math> such that for any <math>x \in M</math> the restriction <math>g_x : T_xM \times T_xM \to \R</math> is an inner product on <math>T_xM.</math>Template:Citation needed
• A strong Riemannian metric on <math>M</math> is a weak Riemannian metric such that <math>g_x</math> induces the topology on <math>T_xM</math>. If <math>g</math> is a strong Riemannian metric, then <math>M</math> must be a Hilbert manifold.Template:Citation needed

ExamplesEdit

• If <math>(H, \langle \,\cdot, \cdot\, \rangle)</math> is a Hilbert space, then for any <math>x \in H,</math> one can identify <math>H</math> with <math>T_xH.</math> The metric <math>g_x(u,v) = \langle u, v \rangle</math> for all <math>x, u, v \in H</math> is a strong Riemannian metric.Template:Citation needed
• Let <math>(M, g)</math> be a compact Riemannian manifold and denote by <math>\operatorname{Diff}(M)</math> its diffeomorphism group. The latter is a smooth manifold (see here) and in fact, a Lie group.Template:Citation needed Its tangent bundle at the identity is the set of smooth vector fields on <math>M.</math>Template:Citation needed Let <math>\mu</math> be a volume form on <math>M.</math> The <math>L^2</math> weak Riemannian metric on <math>\operatorname{Diff}(M)</math>, denoted <math>G</math>, is defined as follows. Let <math>f\in \operatorname{Diff}(M),</math> <math>u, v \in T_f\operatorname{Diff}(M).</math> Then for <math>x \in M, u(x) \in T_{f(x)}M</math>,

  <math>G_f(u,v) = \int _M g_{f(x)} (u(x),v(x)) \, d\mu (x)</math>.Template:Citation needed

Metric space structureEdit

Length of curves and the Riemannian distance function <math>d_g : M \times M \to [0,\infty)</math> are defined in a way similar to the finite-dimensional case. The distance function <math>d_g</math>, called the geodesic distance, is always a pseudometric (a metric that does not separate points), but it may not be a metric.Template:Sfn In the finite-dimensional case, the proof that the Riemannian distance function separates points uses the existence of a pre-compact open set around any point. In the infinite case, open sets are no longer pre-compact, so the proof fails.

• If <math>g</math> is a strong Riemannian metric on <math>M</math>, then <math>d_g</math> separates points (hence is a metric) and induces the original topology.Template:Citation needed
• If <math>g</math> is a weak Riemannian metric, <math>d_g</math> may fail to separate points. In fact, it may even be identically 0.Template:Sfn For example, if <math>(M, g)</math> is a compact Riemannian manifold, then the <math>L^2</math> weak Riemannian metric on <math>\operatorname{Diff}(M)</math> induces vanishing geodesic distance.Template:Sfn

Hopf–Rinow theoremEdit

In the case of strong Riemannian metrics, one part of the finite-dimensional Hopf–Rinow still holds.

Theorem: Let <math>(M, g)</math> be a strong Riemannian manifold. Then metric completeness (in the metric <math>d_g</math>) implies geodesic completeness.Template:Citation needed

However, a geodesically complete strong Riemannian manifold might not be metrically complete and it might have closed and bounded subsets that are not compact.Template:Citation needed Further, a strong Riemannian manifold for which all closed and bounded subsets are compact might not be geodesically complete.Template:Citation needed

If <math>g</math> is a weak Riemannian metric, then no notion of completeness implies the other in general.Template:Citation needed

See alsoEdit

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• Smooth manifold
• Riemannian geometry
• Finsler manifold
• Sub-Riemannian manifold
• Pseudo-Riemannian manifold
• Metric tensor
• Hermitian manifold
• Symplectic manifold
• Kahler manifold
• Einstein manifold

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ReferencesEdit

NotesEdit

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SourcesEdit

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External linksEdit

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