- Flat (geometry)
In
geometry , a flat is a subset of "n"-dimensional space that is congruent to aEuclidean space of lowerdimension . The flats in two-dimensional space are points and lines, and the flats inthree-dimensional space are points, lines, and planes.In "n"-dimensional space, there are flats of every dimension from 0 to "n" – 1. [In addition, all of "n"-dimensional space is sometimes considered an "n"-dimensional flat as a subset of itself.] Flats of dimension "n" – 1 are calledhyperplane s.Flats are similar to
Euclidean subspace s, except that they need not pass through the origin. If Euclidean space is considered as anaffine space , the flats are precisely theaffine subspace s. Flats are important inlinear algebra , where they provide a geometric realization of the solution set for asystem of linear equations .Description
A flat can be described by a
system of linear equations . For example, a line in two-dimensional space can be described by a single linear equation involving "x" and "y"::In three dimensional space, a single linear equation involving "x", "y", and "z" defines a plane, while a pair of linear equations can be used to describe a line. In general, a linear equation in "n" variables describes a hyperplane, and a system of linear equations describes the intersection of those hyperplanes. Assuming the equations are consistent andlinearly independent , a system of "k" equations describes a flat of dimension "n" – "k".A flat can also be described by a system of linear
parametric equation s. A line can be described by equations involving oneparameter ::while the description of a plane would require two parameters::In general, a parameterization of a flat of dimension "k" would require parameters "t"1, ..., "tk".Systematic coordinates for flats in any dimension build on either joins or meets, leading to Grassmann coordinates or dual Grassmann coordinates. For example, a line in three-dimensional space is determined by two distinct points or by two distinct planes. (If the planes are parallel, the ambient space must be a
projective space to accommodate a line "at infinity".)A flat is also called a
linear manifold orlinear variety .Notes
References
* citation
last = Stolfi
first = Jorge
title = Oriented Projective Geometry
publisher =Academic Press
date = 1991
isbn = 978-0-12-672025-9
From originalStanford Ph.D. dissertation, "Primitives for Computational Geometry", available as [http://ftp.digital.com/pub/compaq/SRC/research-reports/abstracts/src-rr-036.html DEC SRC Research Report 36] .
* [http://planetmath.org/encyclopedia/LinearManifold.html PlanetMath: linear manifold]ee also
*
Euclidean subspace
*Affine space
*System of linear equations
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