About: Nested intervals

Facets (new session)
Description
Metadata
Settings
- Rule:
- Inverse Functional Properties:
- "Same As":

About: Nested intervals Goto Sponge NotDistinct Permalink

An Entity of Type : yago:Theorem106752293, within Data Space : dbpedia.demo.openlinksw.com associated with source document(s)
QRcode icon

http://dbpedia.demo.openlinksw.com/describe/?url=http%3A%2F%2Fdbpedia.org%2Fresource%2FNested_intervals&invfp=IFP_OFF&sas=SAME_AS_OFF

In mathematics, a sequence of nested intervals can be intuitively understood as an ordered collection of intervals on the real number line with natural numbers as an index. In order for a sequence of intervals to be considered nested intervals, two conditions have to be met: 1. * Every interval in the sequence is contained in the previous one ( is always a subset of ). 2. * The length of the intervals get arbitrarily small (meaning the length falls below every possible threshold after a certain index ).

Attributes	Values
rdf:type	yago:WikicatMathematicalTheorems yago:WikicatTheoremsInAnalysis yago:WikicatTheoremsInRealAnalysis yago:WikicatSetsOfRealNumbers yago:Abstraction100002137 yago:Collection107951464 yago:Communication100033020 yago:Group100031264 yago:Message106598915 yago:Proposition106750804 yago:Set107996689 yago:Statement106722453 yago:Theorem106752293
rdfs:label	Intervallschachtelung (de) Principio de los intervalos encajados (es) 축소구간정리 (ko) Nested intervals (en) Teorema do encaixe de intervalos (pt) Лемма о вложенных отрезках (ru) 区间套 (zh) Лема про вкладені відрізки (uk)
rdfs:comment	En matemática, se denomina familia de intervalos encajonados (o encajados) a una familia de subconjuntos de tales que: 1. * Cada uno de los conjuntos Ik es un intervalo, es decir, un conjunto de la forma (intervalo cerrado), (intervalo abierto), o semiabierto, en que la desigualdad es estricta solamente en uno de los extremos. 2. * Se cumple que , esto es, cada intervalo Ik está contenido en el anterior. 3. * Se tiene que, si los extremos de cada intervalo Ik son ak y bk, entonces , esto es, los intervalos se hacen cada vez más pequeños y terminan siendo de longitud menor a cualquier cantidad positiva. (es) 수학에서 축소구간열(縮小區間列, sequence of nested intervals)은 각 구간이 바로 앞 구간의 부분 집합인 구간들의 열이다. 축소구간정리(縮小區間定理, 영어: nested intervals theorem)에 따르면, 닫힌구간으로 구성된 축소구간열은 적어도 하나의 공통 원소를 갖는다. (ko) Лема про вкладені відрізки, або принцип вкладених відрізків Коші — Кантора, або принцип неперервності Кантора — фундаментальне твердження у математичному аналізі, яке стверджує, що будь-яка послідовність вкладених відрізків на дійсній прямій, довжина яких прямує до нуля, має єдину спільну точку. (uk) Em matemática, o teorema do encaixe de intervalos afirma que qualquer sucessão decrescente de intervalos de números reais tem, pelo menos, um ponto em comum. (pt) 在數學中，一串區間套是實數中的一串區間In（n=1, 2, 3, ...），使得對於每個n都有In + 1 是In的子集，有時我們要求它是真子集。換而言之，在這串區間中，區間從左邊逐漸往右收縮，而在右邊逐漸往左收縮。關於區間套的主要問題在於探討所有區間In的交集（記作J）的性狀。事實上，當In都是開集時，J有可能為空集。例如開區間套(0, 2−n)的交集就是空集：任何一個正數x都在n充分大之後大於2−n，故而x不在J中。但對於閉集而言，情況有所不同。事實上，我們有閉區間套定理，這一定理刻劃了實數的完備性。定理聲稱對於任一的有界閉區間套In（例如In = [an, bn]並滿足an ≤ bn），它們的交集In非空，且為閉區間；特別地，假若，則它們的交集J為一個包含且僅包含的單點集。 (zh) Лемма о вложенных отрезках, или принцип вложенных отрезков Коши — Кантора, или принцип непрерывности Кантора — фундаментальное утверждение в математическом анализе, связанное с полнотой поля вещественных чисел. (ru) Das Intervallschachtelungsprinzip wird besonders in der Analysis in Beweisen benutzt und bildet in der numerischen Mathematik die Grundlage für einige Lösungsverfahren. Das Prinzip ist Folgendes: Man fängt mit einem beschränkten Intervall an und wählt aus diesem Intervall ein abgeschlossenes Intervall, das komplett in dem vorherigen Intervall liegt, wählt dort wieder ein abgeschlossenes Intervall heraus und so weiter. Werden die Längen der Intervalle beliebig klein, konvergiert also ihre Länge gegen Null, so gibt es genau eine reelle Zahl, die in allen Intervallen enthalten ist. Wegen dieser Eigenschaft können Intervallschachtelungen herangezogen werden, um mit ihnen die reellen Zahlen als Zahlbereichserweiterung der rationalen Zahlen zu konstruieren. (de) In mathematics, a sequence of nested intervals can be intuitively understood as an ordered collection of intervals on the real number line with natural numbers as an index. In order for a sequence of intervals to be considered nested intervals, two conditions have to be met: 1. * Every interval in the sequence is contained in the previous one ( is always a subset of ). 2. * The length of the intervals get arbitrarily small (meaning the length falls below every possible threshold after a certain index ). (en)
foaf:depiction
dcterms:subject	Theorems in real analysis Sets of real numbers
Wikipage page ID	7532405 (xsd:integer)
Wikipage revision ID	1122161694 (xsd:integer)
Link from a Wikipage to another Wikipage	Calculus Root-finding algorithms Bisection method Algorithm Archimedean property De Morgan's laws Infimum and supremum Limit of a sequence Multiplicative inverse Continuous function Mathematical analysis Mathematics Circle Engineering Gottfried Wilhelm Leibniz Connectedness Ordered field Approximation Ludolph van Ceulen Complete metric space Computer science Empty set Physics Babylonia Disjoint sets Field (mathematics) Cauchy sequence Differential equation Closed interval Recursion Hermann Weyl Hexagon Intersection (set theory) Interval (mathematics) Isaac Newton Archimedes Theorems in real analysis Bisection Differentiable function Differential calculus Bolzano–Weierstrass theorem Pi Square number Integral Methods of computing square roots Natural number Newton's method Cantor's intersection theorem Sets of real numbers Rational number Real number Sequence Singleton (mathematics) Without loss of generality Limit point Real line Uncountable Closed disk
Link from a Wikipage to an external page	https://books.google.com/books%3Fid=GELCAgAAQBAJ&pg=PA21%7Cpages=21%E2%80%9322 https://books.google.com/books%3Fid=SaZYs-OKqJcC&pg=PA29%7Ccontribution=3.3 https://books.google.com/books%3Fid=gBPI_oYZoMMC&pg=PA45%7Ccontribution=Theorem https://link.springer.com/book/10.1007/978-3-642-18490-1
sameAs	Nested intervals

Faceted Search & Find service v1.17_git139 as of Feb 29 2024

Alternative Linked Data Documents: ODE Content Formats:

RDF

ODATA

Microdata

About

OpenLink Virtuoso version 08.03.3330 as of Mar 19 2024, on Linux (x86_64-generic-linux-glibc212), Single-Server Edition (378 GB total memory, 60 GB memory in use)
Data on this page belongs to its respective rights holders.
Virtuoso Faceted Browser Copyright © 2009-2024 OpenLink Software