In
mathematics, the dimension of an object is, roughly speaking, the number of
degrees of freedom of a point that moves on this object. In other words, the dimension is the number of independent
parameters or
coordinates that are needed for defining the position of a point that is constrained to be on the object. For example, the dimension of a point is
zero; the dimension of a
line is
one, as a point can move on a line in only one direction (or its opposite); the dimension of a
plane is
two, etc. The dimension is an intrinsic property of an object, in the sense that it is independent of the dimension of the space in which the object is or can be
embedded. For example, a
curve, such as a
circle, is of dimension one, because the position of a point on a curve is determined by its signed distance along the curve to a fixed point on the curve. This is independent from the fact that a curve cannot be embedded in a
Euclidean space of dimension lower than two, unless it is a line. Similarly, a
surface is of dimension two, even if embedded in
three-dimensional space. The dimension of
Euclidean -space is . When trying to generalize to other types of spaces, one is faced with the question "what makes -dimensional?" One answer is that to cover a fixed
ball in by small balls of radius , one needs on the order of such small balls. This observation leads to the definition of the
Minkowski dimension and its more sophisticated variant, the
Hausdorff dimension, but there are also other answers to that question. For example, the boundary of a ball in looks locally like and this leads to the notion of the
inductive dimension. While these notions agree on , they turn out to be different when one looks at more general spaces. A
tesseract is an example of a four-dimensional object. Whereas outside mathematics the use of the term "dimension" is as in: "A tesseract
has four dimensions", mathematicians usually express this as: "The tesseract
has dimension 4", or: "The dimension of the tesseract
is 4". Although the notion of higher dimensions goes back to
René Descartes, substantial development of a higher-dimensional geometry only began in the 19th century, via the work of
Arthur Cayley,
William Rowan Hamilton,
Ludwig Schläfli and
Bernhard Riemann. Riemann's 1854
Habilitationsschrift, Schläfli's 1852
Theorie der vielfachen Kontinuität, and Hamilton's discovery of the
quaternions and
John T. Graves' discovery of the
octonions in 1843 marked the beginning of higher-dimensional geometry. The rest of this section examines some of the more important mathematical definitions of dimension.
Vector spaces The dimension of a
vector space is the number of vectors in any
basis for the space,
i.e. the number of coordinates necessary to specify any vector. This notion of dimension (the
cardinality of a basis) is often referred to as the
Hamel dimension or
algebraic dimension to distinguish it from other notions of dimension. For the non-
free case, this generalizes to the notion of the
length of a module.
Manifolds The uniquely defined dimension of every
connected topological
manifold can be calculated. A connected topological manifold is
locally homeomorphic to Euclidean -space, in which the number is the manifold's dimension. For connected
differentiable manifolds, the dimension is also the dimension of the
tangent vector space at any point. In
geometric topology, the theory of manifolds is characterized by the way dimensions 1 and 2 are relatively elementary, the
high-dimensional cases are simplified by having extra space in which to "work"; and the cases and are in some senses the most difficult. This state of affairs was highly marked in the various cases of the
Poincaré conjecture, in which four different proof methods are applied.
Complex dimension mapped to the other pole. The dimension of a manifold depends on the base field with respect to which Euclidean space is defined. While analysis usually assumes a manifold to be over the
real numbers, it is sometimes useful in the study of
complex manifolds and
algebraic varieties to work over the
complex numbers instead. A complex number (x + iy) has a
real part x and an
imaginary part y, in which x and y are both real numbers; hence, the complex dimension is half the real dimension. Conversely, in algebraically unconstrained contexts, a single complex coordinate system may be applied to an object having two real dimensions. For example, an ordinary two-dimensional
spherical surface, when given a complex metric, becomes a
Riemann sphere of one complex dimension.
Varieties The dimension of an
algebraic variety may be defined in various equivalent ways. The most intuitive way is probably the dimension of the
tangent space at any
Regular point of an algebraic variety. Another intuitive way is to define the dimension as the number of
hyperplanes that are needed in order to have an intersection with the variety that is reduced to a finite number of points (dimension zero). This definition is based on the fact that the intersection of a variety with a hyperplane reduces the dimension by one unless if the hyperplane contains the variety. An
algebraic set being a finite union of algebraic varieties, its dimension is the maximum of the dimensions of its components. It is equal to the maximal length of the chains V_0\subsetneq V_1\subsetneq \cdots \subsetneq V_d of sub-varieties of the given algebraic set (the length of such a chain is the number of "\subsetneq"). Each variety can be considered as an
algebraic stack, and its dimension as variety agrees with its dimension as stack. There are however many stacks which do not correspond to varieties, and some of these have negative dimension. Specifically, if V is a variety of dimension m and G is an
algebraic group of dimension n
acting on V, then the
quotient stack [V/G] has dimension m-n.
Krull dimension The
Krull dimension of a
commutative ring is the maximal length of chains of
prime ideals in it, a chain of length
n being a sequence \mathcal{P}_0\subsetneq \mathcal{P}_1\subsetneq \cdots \subsetneq\mathcal{P}_n of prime ideals related by inclusion. It is strongly related to the dimension of an algebraic variety, because of the natural correspondence between sub-varieties and prime ideals of the ring of the polynomials on the variety. For an
algebra over a field, the dimension as
vector space is finite if and only if its Krull dimension is 0.
Topological spaces For any
normal topological space , the
Lebesgue covering dimension of is defined to be the smallest
integer n for which the following holds: any
open cover has an open refinement (a second open cover in which each element is a subset of an element in the first cover) such that no point is included in more than elements. In this case dim . For a manifold, this coincides with the dimension mentioned above. If no such integer exists, then the dimension of is said to be infinite, and one writes dim . Moreover, has dimension −1, i.e. dim if and only if is empty. This definition of covering dimension can be extended from the class of normal spaces to all
Tychonoff spaces merely by replacing the term "open" in the definition by the term "
functionally open". An
inductive dimension may be defined
inductively as follows. Consider a
discrete set of points (such as a finite collection of points) to be 0-dimensional. By dragging a 0-dimensional object in some direction, one obtains a 1-dimensional object. By dragging a 1-dimensional object in a
new direction, one obtains a 2-dimensional object. In general, one obtains an ()-dimensional object by dragging an -dimensional object in a
new direction. The inductive dimension of a topological space may refer to the
small inductive dimension or the
large inductive dimension, and is based on the analogy that, in the case of metric spaces, balls have -dimensional
boundaries, permitting an inductive definition based on the dimension of the boundaries of open sets. Moreover, the boundary of a discrete set of points is the empty set, and therefore the empty set can be taken to have dimension −1. Similarly, for the class of
CW complexes, the dimension of an object is the largest for which the
-skeleton is nontrivial. Intuitively, this can be described as follows: if the original space can be
continuously deformed into a collection of
higher-dimensional triangles joined at their faces with a complicated surface, then the dimension of the object is the dimension of those triangles.
Hausdorff dimension The
Hausdorff dimension is useful for studying structurally complicated sets, especially
fractals. The Hausdorff dimension is defined for all
metric spaces and, unlike the dimensions considered above, can also have non-integer real values. The
box dimension or
Minkowski dimension is a variant of the same idea. In general, there exist more definitions of
fractal dimensions that work for highly irregular sets and attain non-integer positive real values.
Hilbert spaces Every
Hilbert space admits an
orthonormal basis, and any two such bases for a particular space have the same
cardinality. This cardinality is called the dimension of the Hilbert space. This dimension is finite if and only if the space's
Hamel dimension is finite, and in this case the two dimensions coincide. == In physics ==