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Difference between revisions of "Nucleus"

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(Created page with "In mathematics, and especially in order theory, a '''nucleus''' is a function <math>F</math> on a meet-semilattice <math>\mathfrak{A}</math> such that (for every <math>p</...")
 
(Every nucleus is evidently a monotone function.)
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# <math>F(F(p)) = F(p)</math>
 
# <math>F(F(p)) = F(p)</math>
 
# <math>F(p \wedge q) = F(p) \wedge F(q)</math>
 
# <math>F(p \wedge q) = F(p) \wedge F(q)</math>
 +
 +
Every nucleus is evidently a monotone function.
  
 
Usually, the term ''nucleus'' is used in [[frames and locales]] theory (when the semilattice <math>\mathfrak{A}</math> is a frame).
 
Usually, the term ''nucleus'' is used in [[frames and locales]] theory (when the semilattice <math>\mathfrak{A}</math> is a frame).

Revision as of 15:28, 18 December 2014

In mathematics, and especially in order theory, a nucleus is a function \(F\) on a meet-semilattice \(\mathfrak{A}\) such that (for every \(p\) in \(\mathfrak{A}\)):

  1. \(p \le F(p)\)
  2. \(F(F(p)) = F(p)\)
  3. \(F(p \wedge q) = F(p) \wedge F(q)\)

Every nucleus is evidently a monotone function.

Usually, the term nucleus is used in frames and locales theory (when the semilattice \(\mathfrak{A}\) is a frame).

Some well known results about nuclei

Proposition: If \(F\) is a nucleus on a frame \(\mathfrak{A}\), then the poset \(\operatorname{Fix}(F)\) of fixed points of \(F\), with order inherited from \(\mathfrak{A}\), is also a frame.

How to Cite This Entry:
Nucleus. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Nucleus&oldid=35678