Axiom of choice/Related Articles: Difference between revisions
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Latest revision as of 06:01, 15 July 2024
- See also changes related to Axiom of choice, or pages that link to Axiom of choice or to this page or whose text contains "Axiom of choice".
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- Cardinal number [r]: The generalization of natural numbers (as means to count the elements of a set) to infinite sets. [e]
- Continuum hypothesis [r]: A statement about the size of the continuum, i.e., the number of elements in the set of real numbers. [e]
- Kurt Gödel [r]: (1906-1978) Austrian-born, American mathematician, most famous for proving that in any logical system rich enough to describe naturals, there are always statements that are true but impossible to prove within the system; considered to be one of the most important figures in mathematical logic in modern times. [e]
- Measure (mathematics) [r]: Systematic way to assign to each suitable subset a number, intuitively interpreted as the size of the subset. [e]
- Oxford University Press [r]: Major international publisher of scholarly books, journals and reference works. [e]
- Vitali set [r]: Set of real numbers such that the difference of any two members of the set is an irrational number and any real number is the sum of a rational number and a member of the set. [e]
- Aleph-0 [r]: Cardinality (size) of the set of all natural numbers. [e]
- Theoretical chemistry [r]: The description of atoms, molecules and reactions in mathematical form. [e]
- Matroid [r]: Structure that captures the essence of a notion of 'independence' that generalizes linear independence in vector spaces. [e]
- Closure operator [r]: An idempotent unary operator on subsets of a given set, mapping a set to a larger set with a particular property. [e]
- Heisenberg Uncertainty Principle [r]: The quantum-mechanical principle that states that certain pairs of physical properties cannot simultaneously be measured to arbitrary precision. [e]
- CZ Talk:History [r]: Add brief definition or description
- Power set [r]: The set of all subsets of a given set. [e]