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In summary, series addition and scalar multiplication gives the set of convergent series and the set of series of real numbers the structure of a real vector space. Similarly, one gets complex vector spaces for series and convergent series of complex numbers. All these vector spaces are infinite dimensional.
An example is given by the real numbers, which are complete but homeomorphic to the open interval (0,1), which is not complete. In topology one considers completely metrizable spaces, spaces for which there exists at least one complete metric inducing the given topology. Completely metrizable spaces can be characterized as those spaces that can ...
Thus, the Cantor set is a homogeneous space in the sense that for any two points and in the Cantor set , there exists a homeomorphism : with () =. An explicit construction of h {\displaystyle h} can be described more easily if we see the Cantor set as a product space of countably many copies of the discrete space { 0 , 1 } {\displaystyle \{0,1\}} .
Example: the blue circle represents the set of points (x, y) satisfying x 2 + y 2 = r 2. The red disk represents the set of points (x, y) satisfying x 2 + y 2 < r 2. The red set is an open set, the blue set is its boundary set, and the union of the red and blue sets is a closed set. In mathematics, an open set is a generalization of an open ...
A complete graph with n nodes represents the edges of an (n – 1)-simplex. Geometrically K 3 forms the edge set of a triangle, K 4 a tetrahedron, etc. The Császár polyhedron, a nonconvex polyhedron with the topology of a torus, has the complete graph K 7 as its skeleton. [15] Every neighborly polytope in four or more dimensions also has a ...
An axiomatic definition of the real numbers consists of defining them as the elements of a complete ordered field. [2] [3] [4] This means the following: The real numbers form a set, commonly denoted , containing two distinguished elements denoted 0 and 1, and on which are defined two binary operations and one binary relation; the operations are called addition and multiplication of real ...
Zermelo–Fraenkel set theory with the axiom of choice guarantees the existence of a basis of this vector space: there exists a set B of real numbers such that every real number can be written uniquely as a finite linear combination of elements of this set, using rational coefficients only, and such that no element of B is a rational linear ...
Balanced set – Construct in functional analysis; Bounded set (topological vector space) – Generalization of boundedness; Convex set – In geometry, set whose intersection with every line is a single line segment; Star domain – Property of point sets in Euclidean spaces; Symmetric set – Property of group subsets (mathematics)