Scale-space axioms: Difference between revisions

Latest revision as of 12:52, 29 November 2013

The continuum function is $κ \mapsto 2^{κ}$ , i.e. raising 2 to the power of κ using cardinal exponentiation. Given a cardinal number, it is the cardinality of the power set of a set of the given cardinality.

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+The '''continuum function''' is <math>\kappa\mapsto 2^\kappa</math>, i.e. raising 2 to the power of &kappa; using [[cardinal exponentiation]].  Given a [[cardinal number]], it is the cardinality of the [[power set]] of a set of the given cardinality.
+==See also==
+*[[Continuum hypothesis]]
+*[[Cardinality of the continuum]]
+*[[Beth number]]
+*[[Gimel function]]
+{{settheory-stub}}
+[[Category:Cardinal numbers]]