Cantor's diagonal argument/Related Articles: Difference between revisions
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{{r|Halting problem}} | {{r|Halting problem}} | ||
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{{r|Laplace expansion (potential)}} | |||
{{r|Helmholtz decomposition}} |
Latest revision as of 17:00, 24 July 2024
- See also changes related to Cantor's diagonal argument, or pages that link to Cantor's diagonal argument or to this page or whose text contains "Cantor's diagonal argument".
Parent topics
- Set theory [r]: Mathematical theory that models collections of (mathematical) objects and studies their properties. [e]
- Mathematical proof [r]: Add brief definition or description
- Georg Cantor [r]: (1845-1918) Danish-German mathematician who introduced set theory and the concept of transcendental numbers [e]
- Cardinality [r]: The size, i.e., the number of elements, of a (possibly infinite) set. [e]
- Power set [r]: The set of all subsets of a given set. [e]
- Natural number [r]: An element of 1, 2, 3, 4, ..., often also including 0. [e]
- Real number [r]: A limit of the Cauchy sequence of rational numbers. [e]
- Countable set [r]: A set with as many elements as there are natural numbers, or less. [e]
- Halting problem [r]: The task to decide whether a certain computer (executing a certain program) will eventually stop. [e]
- Ampere's equation [r]: An expression for the magnetic force between two electric current-carrying wire segments. [e]
- Laplace expansion (potential) [r]: An expansion by means of which the determinant of a matrix may be computed in terms of the determinants of all possible smaller square matrices contained in the original. [e]
- Helmholtz decomposition [r]: Decomposition of a vector field in a transverse (divergence-free) and a longitudinal (curl-free) component. [e]