Affine space/Related Articles: Difference between revisions
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imported>Boris Tsirelson (→Parent topics: Space (mathematics)) |
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Latest revision as of 06:00, 7 July 2024
- See also changes related to Affine space, or pages that link to Affine space or to this page or whose text contains "Affine space".
Parent topics
- Space (mathematics) [r]: A set with some added structure, which often form a hierarchy, i.e., one space may inherit all the characteristics of a parent space. [e]
Subtopics
Bot-suggested topics
Auto-populated based on Special:WhatLinksHere/Affine space. Needs checking by a human.
- Barycentric coordinates [r]: The weights that would have to be assigned to a system of reference points to yield a given position as barycentre are used as coordinates. [e]
- Cartesian coordinates [r]: Set of real numbers specifying the position of a point in two- or three-dimensional space with respect to orthogonal axes. [e]
- Euclidean plane [r]: The plane known from high-school planar geometry. [e]
- Matroid [r]: Structure that captures the essence of a notion of 'independence' that generalizes linear independence in vector spaces. [e]
- Pointed set [r]: A set together with a distinguished element, known as the base point. [e]
- Rigid motion [r]: A transformation which preserves the geometrical properties of the Euclidean spacea distance-preserving mapping or isometry. [e]
- Rotation matrix [r]: a 3×3 proper (unit determinant) orthogonal (orthonormal rows and columns) matrix [e]
- Vector (mathematics) [r]: A mathematical object with magnitude and direction. [e]
- Euclidean space [r]: real finite-dimensional inner product space; possibly with translations defined on it. [e]
- Rigid motion [r]: A transformation which preserves the geometrical properties of the Euclidean spacea distance-preserving mapping or isometry. [e]
- Barycentric coordinates [r]: The weights that would have to be assigned to a system of reference points to yield a given position as barycentre are used as coordinates. [e]
- Normed space [r]: A vector space that is endowed with a norm. [e]
- Basis (linear algebra) [r]: A set of vectors that, in a linear combination, can represent every vector in a given vector space or free module, and such that no element of the set can be represented as a linear combination of the others. [e]