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Page "Well-behaved" ¶ 17
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** and vector
** Every vector space has a basis.
** The closed unit ball of the dual of a normed vector space over the reals has an extreme point.
** On every infinite-dimensional topological vector space there is a discontinuous linear map.
** vector algebra and vector differential operators
** Parity function, a Boolean function whose value is 1 if the input vector has an odd number of ones
** A more automatic and general vectorized interrupt system, mode 2, as well as a fixed vector interrupt system, mode 1, for simple systems with minimal hardware ( mode 0 being the 8080-compatible mode ).
** the category of vector spaces over a field K.
** the category of vector spaces over a field K.
** K-Vect, the category of vector spaces over a field K
** The category of finite-dimensional vector spaces
** Linear algebra explains how a vector space can be given a basis, and then any vector can be expressed in this basis.
** Lyapunov vector
** Sample a new position y by adding a normally distributed random vector to the current position x
** is the-dimensional input vector.
** Homogeneous dilation ( homothety ), the scalar multiplication operator on a vector space or affine space
** vector space valued functions ( not necessarily linear ),
** d ( p * E, p * F, σ ( D )) is the " difference element " of K ( B ( X )/ S ( X )) associated to two vector bundles p * E and pF on B ( X ) and an isomorphism σ ( D ) between them on the subspace S ( X ).
** K-Vect, the category of vector spaces over a field K, with the one-dimensional vector space K serving as the unit.
** Chern class, a type of characteristics class associated to complex vector bundles ; named after Shiing-Shen Chern
** List of vector spaces in mathematics
** Poynting vector, a representation of the energy flux of an electromagnetic field

** and spaces
** Tychonoff's theorem stating that every product of compact topological spaces is compact.
** The Baire category theorem about complete metric spaces, and its consequences, such as the open mapping theorem and the closed graph theorem.
** In topology, morphisms between topological spaces are called continuous maps, and an automorphism of a topological space is a homeomorphism of the space to itself, or self-homeomorphism ( see homeomorphism group ).
** Social Security number with no dashes and no spaces
** Social Security number with no dashes or spaces followed immediately by " USN ", space, blood group
** Social Security number, no dashes or spaces, followed immediately by branch ( i. e., 123456789USCG )
** the product of topological spaces,
** In very technical language: The nominal frequency or center frequency of various kinds of radio signals with digital modulation -- provided that the message bit stream is a random uncorrelated sequence of equally probable ones and zeroes (" marks " and " spaces ")
** More generally, Rademacher's theorem extends the differentiability result to Lipschitz mappings between Euclidean spaces: a Lipschitz map ƒ: U → R < sup > m </ sup >, where U is an open set in R < sup > n </ sup >, is almost everywhere differentiable.
** Top, the category of topological spaces
** CmptH, the category of all compact Hausdorff spaces
** see also Kensington and Chelsea parks and open spaces
** Category ( topology ) in the context of Baire spaces
** Hydraulic conductivity, the ease with which water can move through pore spaces or fractures in soil or rock
** Known for his work on Sobolev spaces
** Working spaces, the color spaces in which color data is meant to be manipulated
** The FBI uses endoscopes for conducting surveillance via tight spaces.
** the 2nd to 5th left intercostal spaces
** Projective geometry is a non-Euclidean geometry that involves projective spaces.
** Join ( topology ), an operation combining two topological spaces

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