Basis (mathematics): Difference between revisions
imported>Barry R. Smith (change to disambiguation page) |
imported>Richard Pinch (added base and anchored; added filter base; mentioned ideal for Groebner basis) |
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This is a disambiguation page for the different uses of the | This is a disambiguation page for the different uses of the words '''base''' or '''basis''' in [[mathematics]]. | ||
* A [[basis (linear algebra)|basis]] is a [[linearly independent]] [[span (linear algebra)|spanning set]] in [[linear algebra]]. | * A [[basis (linear algebra)|basis]] is a [[linearly independent]] [[span (linear algebra)|spanning set]] in [[linear algebra]]. | ||
* A [[basis (topology)|basis]] (or base) for a [[topology]] is a system of [[open set]]s that generate the topology. | * A [[basis (topology)|basis]] (or base) for a [[topology]] is a system of [[open set]]s that generate the topology. | ||
* In [[algebraic geometry]], there exists the notion of a [[ | * A [[filter base]] is a collection of sets that generates a [[filter]]. | ||
* In [[algebraic geometry]], there exists the notion of a [[Gröbner basis]] of an [[ideal]]. | |||
Revision as of 01:17, 2 December 2008
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This is a disambiguation page for the different uses of the words base or basis in mathematics.
- A basis is a linearly independent spanning set in linear algebra.
- A basis (or base) for a topology is a system of open sets that generate the topology.
- A filter base is a collection of sets that generates a filter.
- In algebraic geometry, there exists the notion of a Gröbner basis of an ideal.