Existence theorem (nonfiction): Difference between revisions
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In mathematics, an existence theorem is a theorem with a statement beginning 'there exist(s) ..', or more generally 'for all x, y, ... there exist(s) ...' | In mathematics, an '''existence theorem''' is a theorem with a statement beginning 'there exist(s) ..', or more generally 'for all x, y, ... there exist(s) ...'. | ||
A controversy that goes back to the early twentieth century concerns the issue of purely theoretic existence theorems, i.e., theorems depending on non-constructive foundational material such as the axiom of infinity, the axiom of choice, or the law of excluded middle. Such theorems provide no indication as to how to exhibit, or construct, the object whose existence is claimed. From a constructivist viewpoint, by admitting them mathematics loses its concrete applicability. | == Description == | ||
That is, in more formal terms of symbolic logic, it is a theorem with a prenex normal form involving the existential quantifier. | |||
Many such theorems will not do so explicitly, as usually stated in standard mathematical language. For example, the statement that the sine function is continuous; or any theorem written in big O notation. The quantification can be found in the definitions of the concepts used. | |||
== Controversy == | |||
A controversy that goes back to the early twentieth century concerns the issue of purely theoretic existence theorems, i.e., theorems depending on non-constructive foundational material such as the axiom of infinity, the axiom of choice, or the law of excluded middle. | |||
Such theorems provide no indication as to how to exhibit, or construct, the object whose existence is claimed. | |||
From a constructivist viewpoint, by admitting them mathematics loses its concrete applicability. | |||
The opposing viewpoint is that abstract methods are far-reaching, in a way that numerical analysis cannot be. | |||
== Nonfiction cross-reference == | == Nonfiction cross-reference == | ||
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* [https://en.wikipedia.org/wiki/Existence_theorem Existence theorem] @ Wikipedia | * [https://en.wikipedia.org/wiki/Existence_theorem Existence theorem] @ Wikipedia | ||
[[Category:Nonfiction (nonfiction)]] | |||
[[Category:Mathematics (nonfiction)]] |
Latest revision as of 06:53, 21 April 2016
In mathematics, an existence theorem is a theorem with a statement beginning 'there exist(s) ..', or more generally 'for all x, y, ... there exist(s) ...'.
Description
That is, in more formal terms of symbolic logic, it is a theorem with a prenex normal form involving the existential quantifier.
Many such theorems will not do so explicitly, as usually stated in standard mathematical language. For example, the statement that the sine function is continuous; or any theorem written in big O notation. The quantification can be found in the definitions of the concepts used.
Controversy
A controversy that goes back to the early twentieth century concerns the issue of purely theoretic existence theorems, i.e., theorems depending on non-constructive foundational material such as the axiom of infinity, the axiom of choice, or the law of excluded middle.
Such theorems provide no indication as to how to exhibit, or construct, the object whose existence is claimed.
From a constructivist viewpoint, by admitting them mathematics loses its concrete applicability.
The opposing viewpoint is that abstract methods are far-reaching, in a way that numerical analysis cannot be.
Nonfiction cross-reference
Fiction cross-reference
External links
- Existence theorem @ Wikipedia