Pointed set: Difference between revisions

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In set theory, a pointed set is a set together with a distinguished element, known as the base point. Mappings between pointed sets are assumed to respect the base point.

Formally, a pointed set is a pair $(X,b)$ where $b\in X$ . A mapping from the pointed set $(X,b)$ to $(Y,c)$ is a function $f:X\rightarrow Y$ such that $f(b)=c$ .

Examples

Many algebraic structures such as a monoid, group or vector space have a distinguished element, such as an identity element, and morphisms of the structures respect those elements.
In homotopy theory, the fundamental group of a topological space is defined in terms of a base point.
Choice of base point is the distinction between certain types of structure:
- Principal homogeneous space versus abelian group;
- Affine space versus vector space;
- Algebraic curve of genus one versus elliptic curve.

Revision as of 11:04, 22 November 2008 (view source) imported>Richard Pinch (added affine space vs vector space) ← Older edit		Revision as of 11:06, 22 November 2008 (view source) imported>Richard Pinch (subpages) Newer edit →
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	In [[set theory]], a '''pointed set''' is a [[set (mathematics)\|set]] together with a distinguished element, known as the '''base point'''. Mappings between pointed sets are assumed to respect the base point.		In [[set theory]], a '''pointed set''' is a [[set (mathematics)\|set]] together with a distinguished element, known as the '''base point'''. Mappings between pointed sets are assumed to respect the base point.

Pointed set: Difference between revisions

Revision as of 11:06, 22 November 2008

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