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{{About|mathematics|housing estates|overspill estate}} | |||
In [[non-standard analysis]], a branch of [[mathematics]], '''overspill''' (referred to as ''overflow'' by Goldblatt (1998, p. 129)) is a widely used proof technique. It is based on the fact that the set of standard [[natural number]]s '''N''' is not an [[internal set|internal subset]] of the internal set *'''N''' of [[hyperinteger|hypernatural]] numbers. | |||
By applying the [[Mathematical induction|induction principle]] for the standard integers '''N''' and the [[transfer principle]] we get the principle of '''internal induction''': | |||
For any ''internal'' subset ''A'' of *'''N''', if | |||
:# 1 is an element of ''A'', and | |||
:# for every element ''n'' of ''A'', ''n'' + 1 also belongs to ''A'', | |||
then | |||
:''A'' = *'''N''' | |||
If '''N''' were an internal set, then instantiating the internal induction principle with '''N''', it would follow '''N''' = *'''N''' which is known not to be the case. | |||
The overspill principle has a number of useful consequences: | |||
* The set of standard hyperreals is not internal. | |||
* The set of bounded hyperreals is not internal. | |||
* The set of [[infinitesimal]] hyperreals is not internal. | |||
In particular: | |||
* If an internal set contains all infinitesimal non-negative hyperreals, it contains a positive ''non-infinitesimal'' (or ''appreciable'') hyperreal. | |||
* If an internal set contains '''N''' it contains an unlimited (infinite) element of *'''N'''. | |||
==Example== | |||
These facts can be used to prove the equivalence of the following two conditions for an ''internal'' hyperreal-valued function ƒ defined on *'''R'''. | |||
: <math> \forall \epsilon\in \mathbb{R}^+, \exists \delta \in\mathbb{R}^+, |h| \leq \delta \implies |f(x+h) - f(x)| \leq \varepsilon</math> | |||
and | |||
: <math> \forall h \cong 0, \ |f(x+h) - f(x)| \cong 0 </math> | |||
The proof that the second fact implies the first uses overspill, since given a non-infinitesimal positive ''ε'', | |||
: <math> \forall \mbox{ positive } \delta \cong 0, \ (|h| \leq \delta \implies |f(x+h) - f(x)| < \varepsilon).\, </math> | |||
Applying overspill, we obtain a positive appreciable δ with the requisite properties. | |||
These equivalent conditions express the property known in non-standard analysis as '''S'''-'''continuity''' (or [[microcontinuity]]) of ƒ at ''x''. S-continuity is referred to as an external property. The first definition is external because it involves quantification over standard values only. The second definition is external because it involves the external relation of being infinitesimal. | |||
== References == | |||
*[[Robert Goldblatt]] (1998). ''Lectures on the hyperreals. An introduction to nonstandard analysis.'' Springer. | |||
{{Infinitesimals}} | |||
[[Category:Non-standard analysis]] | |||
Revision as of 17:12, 2 December 2013
29 yr old Orthopaedic Surgeon Grippo from Saint-Paul, spends time with interests including model railways, top property developers in singapore developers in singapore and dolls. Finished a cruise ship experience that included passing by Runic Stones and Church. In non-standard analysis, a branch of mathematics, overspill (referred to as overflow by Goldblatt (1998, p. 129)) is a widely used proof technique. It is based on the fact that the set of standard natural numbers N is not an internal subset of the internal set *N of hypernatural numbers.
By applying the induction principle for the standard integers N and the transfer principle we get the principle of internal induction:
For any internal subset A of *N, if
- 1 is an element of A, and
- for every element n of A, n + 1 also belongs to A,
then
- A = *N
If N were an internal set, then instantiating the internal induction principle with N, it would follow N = *N which is known not to be the case.
The overspill principle has a number of useful consequences:
- The set of standard hyperreals is not internal.
- The set of bounded hyperreals is not internal.
- The set of infinitesimal hyperreals is not internal.
In particular:
- If an internal set contains all infinitesimal non-negative hyperreals, it contains a positive non-infinitesimal (or appreciable) hyperreal.
- If an internal set contains N it contains an unlimited (infinite) element of *N.
Example
These facts can be used to prove the equivalence of the following two conditions for an internal hyperreal-valued function ƒ defined on *R.
and
The proof that the second fact implies the first uses overspill, since given a non-infinitesimal positive ε,
Applying overspill, we obtain a positive appreciable δ with the requisite properties.
These equivalent conditions express the property known in non-standard analysis as S-continuity (or microcontinuity) of ƒ at x. S-continuity is referred to as an external property. The first definition is external because it involves quantification over standard values only. The second definition is external because it involves the external relation of being infinitesimal.
References
- Robert Goldblatt (1998). Lectures on the hyperreals. An introduction to nonstandard analysis. Springer.