Difference between revisions of "Interior algebra"

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(Created page with "In abstract algebra, an '''interior algebra''' is a certain type of algebraic structure that encodes the idea of the topological interior of a...")
 
 
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In [[abstract algebra]], an '''interior algebra''' is a certain type of [[algebraic structure]] that encodes the idea of the [[Interior (topology)|topological interior]] of a set.
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In [[abstract algebra]], an '''interior algebra''' is a certain type of [[algebraic structure]] that encodes the idea of the [[Interior (topology)|topological interior]] of a [[Set (mathematics)|set]].
  
 
== Description ==
 
== Description ==
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* [[Modal algebra]]
 
* [[Modal algebra]]
 
* [[Modal logic]]
 
* [[Modal logic]]
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* [[Set (mathematics)]]
 
* [[Variety (universal algebra)]]
 
* [[Variety (universal algebra)]]
  

Latest revision as of 08:51, 14 October 2016

In abstract algebra, an interior algebra is a certain type of algebraic structure that encodes the idea of the topological interior of a set.

Description

Interior algebras are to topology and the modal logic S4 what Boolean algebras are to set theory and ordinary propositional calculus.

Interior algebras form a variety of modal algebras.

See also

External links