*For other uses, see Manifold (disambiguation).* In mathematics, a **manifold** *M* is a type of space, characterized in one of two equivalent ways: Therefore, the Euclidean space itself gives the first example of a manifold. The surface of a sphere such as the Earth provides a more complicated example. Note that the whole surface cannot be drawn on one map, but it can be covered by just a few maps, and hence the surface of the Earth is a (two-dimensional) manifold. ## History
The first to have conceived clearly of curves and surfaces as spaces by themselves was possibly Carl Friedrich Gauss, the founder of intrinsic differential geometry with his theorema egregium. Bernhard Riemann was the first to do extensive work that really required a generalization of manifolds to higher dimensions. Abelian varieties were at that time already implicitly known, as complex manifolds. Lagrangian mechanics and Hamiltonian mechanics, when considered geometrically, were also naturally manifold theories, with a concept of generalized coordinates.
### Intrinsic versus extrinsic The given characterizations are *intrinsic* to *M*: if we imagine a small insect on (or maybe better "in") *M*, with eyes that only see nearby points, we are describing it from the insect's point of view. It is also possible and very useful to describe a manifold from the point of view of an outside observer. For example if a fly is crawling on an orange, we can watch this from outside in three-dimensional space, while the fly is staying on the two-dimension surface of orange peel. This point of view is called *extrinsic*. It is historically prior to the intrinsic point of view. During the nineteenth century, first geometry learned to consider that *N* dimensions were mathematically natural, with *N* > 3, and then that the intrinsic point of view was also geometrical. This was seen in a number of ways, for example when 'space' meant phase space in physics, or 'geometry' meant curvature in Riemannian geometry. Therefore there are dual points of view to acquire on manifolds. They have a certain kind of intrinsic geometry, starting with their topology. They also have a geometry inside other spaces, an *extrinsic* geometry that depends on how they are 'mapped' into another space (think for example that every helix is the *same* line wrapped in different ways round cylinders). Manifolds include familiar curves such as the circle, or surfaces in three-dimensional space that are locally smooth. They include many other possibilities that are harder to visualise, such as the Lie groups basic to mathematics and theoretical physics.
## Technical description In mathematics, a **manifold** is a topological space that looks locally like the "ordinary" Euclidean space **R**^{n} and is a Hausdorff space. To make precise the notion of "looks locally like" one uses *local coordinate systems* or charts. A connected manifold has a definite topological *dimension*, which equals the number of coordinates needed in each local coordinate system. What follows below is a clean, contemporary mathematical treatment of manifolds; the foundational aspects of the subject were clarified during the 1930s, making precise intuitions dating back to the latter half of the 19th century, and developed through differential geometry and Lie group theory. If the local charts on a manifold are compatible in a certain sense, one can talk about directions, tangent spaces, and differentiable functions on that manifold. These manifolds are called *differentiable*. In order to measure lengths and angles, even more structure is needed: one defines *Riemannian manifolds* to recover these geometrical ideas. Differentiable manifolds are used in mathematics to describe geometrical objects; they are also the most natural and general setting to study differentiability. In physics, differentiable manifolds serve as the phase space in classical mechanics and four dimensional pseudo-Riemannian manifolds are used to model spacetime in general relativity.
## Topological manifolds A **topological **`n`-manifold with boundary is a Hausdorff space in which every point has an open neighbourhood homeomorphic to either an open subset of `E`^{ n} (Euclidean `n`-space) or an open subset of the closed half of `E`^{ n}. The set of points which have an open neighbourhood homeomorphic to `E`^{ n} is called the **interior** of the manifold; it is always non-empty. The complement of the interior, is called the **boundary**; it is an (`n`-1)-manifold. A manifold with empty boundary is said to be **closed** if it is compact, and **open** if it is not compact. Manifolds inherit many of the local properties of Euclidean space. In particular, they are locally path-connected, locally compact and locally metrizable. (Readers should see the topology glossary for definitions of topological terms used in this article.) Being locally compact Hausdorff spaces they are necessarily Tychonoff spaces. Requiring a manifold to be Hausdorff may seem strange; it is tempting to think that being locally homeomorphic to a Euclidean space implies being a Hausdorff space. A counterexample is created by deleting zero from the real line and replacing it with *two* points, an open neighborhood of either of which includes all nonzero numbers in some open interval centered at zero. This construction, called the *real line with two origins* is not Hausdorff, because the two origins cannot be separated. Every connected manifold without boundary is homogeneous. It can be shown that a manifold is metrizable if and only if it is paracompact. Non-paracompact manifolds (such as the long line) are generally regarded as pathological, so it's common to add paracompactness to the definition of an `n`-manifold. Sometimes `n`-manifolds are defined to be second-countable, which is precisely the condition required to ensure that the manifold embeds in some finite-dimensional Euclidean space. Note that every compact manifold is second-countable, and every second-countable manifold is paracompact.
## Differentiable manifolds It is easy to define the notion of a topological manifold, but it is very hard to work with this object. The **smooth manifold** defined below works better for most applications, in particular it makes possible to apply "calculus" on the manifold. We start with a topological manifold `M` without boundary. An open set of `M` together with a homeomorphism between the open set and an open set of `E`^{n} is called a coordinate chart. A collection of charts which cover `M` is called an atlas of `M`. The homeomorphisms of two overlapping charts provide a *transition map* from a subset of `E`^{n} to some other subset of `E`^{n}. If all these maps are `k` times continuously differentiable, then the atlas is an `C`^{k} atlas.
**Example**: The unit sphere in **R**^{3} can be covered by two charts: the complements of the north and south poles with coordinate maps - stereographic projections relative to the two poles. Two `C`^{k} atlases are called *equivalent* if their union is a `C`^{k} atlas. This is an equivalence relation, and a `C`^{k} manifold is defined to be a manifold together with an equivalence class of `C`^{k} atlases. If all the connecting maps are infinitely often differentiable, then one speaks of a **smooth** or `C`^{∞} manifold; if they are all analytic, then the manifold is an **analytic** or `C`^{ω} manifold. Intuitively, a smooth atlas provides local coordinate systems such that the change-of-coordinate functions are smooth. These coordinate systems allow one to define differentiability and integrability of functions on `M`. Associated with every point on a differentiable manifold is a tangent space and its dual, the cotangent space. The former consists of the possible directional derivatives, and the latter of the differentials, which can be thought of as infinitesimal elements of the manifold. These spaces always have the same dimension `n` as the manifold does. The collection of all tangent spaces can in turn be made into a manifold, the tangent bundle, whose dimension is 2`n`. Once a `C`^{1} atlas on a paracompact manifold is given, we can refine it to a real analytic atlas (meaning that the new atlas, considered as a *C*^{1} atlas, is equivalent to the given one), and all such refinements give the same analytic manifold. Therefore, one often considers only these latter manifolds. Not every topological manifold admits such a smooth atlas. The lowest dimension is 4 where there are non-smoothable topological manifolds. Also, it is possible for two non-equivalent differentiable manifolds to be homeomorphic. The famous example was given by John Milnor of exotic 7-spheres, i.e. non-diffeomorphic topological 7-spheres.
## Classification of manifolds It is known that every second-countable connected 1-manifold without boundary is homeomorphic either to **R** or the circle. (The unconnected ones are just disjoint unions of these.) For a classification of 2-manifolds, see Surface. The 3-dimensional case may be solved. Thurston's Geometrization Conjecture, if true, together with current knowledge, would imply a classification of 3-manifolds. Grigori Perelman may have proven this conjecture; his work is currently being evaluated, as of June 14, 2003. The classification of *n*-manifolds for *n* greater than three is known to be impossible; it is equivalent to the so-called word problem in group theory, which has been shown to be undecidable. In other words, there is no algorithm for deciding whether given manifold is simply connected. However, there is a classification of simply connected manifolds of dimension ≥ 5.
## Additional structures and generalizations In order to do geometry on manifolds it is usually necessary to adorn these spaces with additional structures, such as the differential structure discussed above. There are numerous other possibilities, depending on the kind of geometry one is interested in: - A Riemannian manifold is a differentiable manifold on which the tangent spaces are equipped with inner products in a differentiable fashion. The inner product structure is given in the form of a symmetric 2-tensor called the Riemannian metric. On a Riemannian manifold one has notions of length, volume, and angle.
- A complex manifold is a manifold modeled on
**C**^{n} with holomorphic transition functions on chart overlaps. These manifolds are the basic objects of study in complex geometry. - A Kähler manifold is a manifold which simultaneously carries a Riemannian structure, a symplectic structure, and a complex structure which are all compatible in some suitable sense.
- A Calabi-Yau manifold is a Kähler manifold which may have applications in physics.
- A Lie group is
`C`^{∞} manifold which also carries a smooth group structure. These are the proper objects for describing symmetries of analytical structures. Manifolds "locally look like" Euclidean space **R**^{n} and are therefore inherently finite-dimensional objects. To allow for infinite dimensions, one may consider **Banach manifolds** which locally look like Banach spaces, or **Fréchet manifolds**, which locally look like Fréchet spaces. Another generalization of manifold allows one to omit the requirement that a manifold be Hausdorff. It still must be second-countable and locally Euclidean, however. Such spaces are called **non-Hausdorff manifolds** and are used in the study of codimension-1 foliations. An orbifold is yet an another generalization of manifold, one that allows certain kinds of "singularities" in the topology. Roughly speaking, it is a space which locally looks like the quotient of Euclidean space by a finite group. The singularities correspond to fixed points of the group action. The category of smooth manifolds with smooth maps lacks certain desirable properties, and people have tried to generalize smooth manifolds in order to rectify this. The diffeological spaces use a different notion of chart known as "plots". Differential spaces and Frölicher spaces are other attempts.
## See also ## References - Kirby, Robion C.; Siebenmann, Laurence C.
*Foundational Essays on Topological Manifolds. Smoothings, and Triangulations*. Princeton, New Jersey: Princeton University Press (1977). ISBN 0-691-08190-5. A detailed study of the category of topological manifolds. - Lee, John M.
*Introduction to topological manifolds*, Springer-Verlag, New York (2000). ISBN 0-387-98759-2. *Introduction to smooth manifolds*, Springer-Verlag, New York (2003). ISBN 0-387-95495-3. Graduate-level textbooks on topological and smooth manifolds. |