PlanetMath: line segment

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line segment

(Definition)

Definition Suppose is a vector space over $\mathbb{R}$ or $\mathbb{C}$ , and is a subset of . Then is a line segment if can be parametrized as

$\displaystyle L = \{ a+tb \mid t\in[0,1]\}$

for some

with $b\neq 0$ .

Sometimes one needs to distinguish between open and closed line segments. Then one defines a closed line segment as above, and an open line segment as a subset that can be parametrized as

$\displaystyle L = \{ a+tb \mid t\in(0,1)\}$

for some

with $b\neq 0$ .

If and are two vectors in and $x \ne y$ , then we denote by the set connecting and . This is , $\{\alpha x + (1-\alpha )y\ \vert 0 \le \alpha \le 1\}$ . One can easily check that is a closed line segment.

Remarks

An alternative, equivalent, definition is as follows: A (closed) line segment is a convex hull of two distinct points.
A line segment is connected, non-empty set.
If is a topological vector space, then a closed line segment is a closed set in . However, an open line segment is an open set in if and only if is one-dimensional.
More generally than above, the concept of a line segment can be defined in an ordered geometry.

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"line segment" is owned by matte. [ full author list (3) ]

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See Also: interval, linear manifold, line in plane

Also defines:

open line segment, closed line segment

Attachments:: endpoint (Definition) by Wkbj79

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Cross-references: ordered geometry, open set, closed set, topological vector space, connected, points, convex hull, closed, vectors, open, subset, vector space
There are 126 references to this entry.

This is version 9 of line segment, born on 2004-04-19, modified 2006-08-20.
Object id is 5783, canonical name is LineSegment.
Accessed 16339 times total.

Classification:

AMS MSC:	03-00 (Mathematical logic and foundations :: General reference works )
	51-00 (Geometry :: General reference works )

Pending Errata and Addenda

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