About: Erdős–Straus conjecture

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Unsolved problem in mathematics: Does have a positive integer solution for every integer ? (more unsolved problems in mathematics) The Erdős–Straus conjecture is an unproven statement in number theory. The conjecture is that, for every integer that is 2 or more, there exist positive integers , , and for which In other words, the number can be written as a sum of three positive unit fractions. If the conjecture is reframed to allow negative unit fractions, then it is known to be true. Generalizations of the conjecture to fractions with numerator 5 or larger have also been studied.

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rdf:type	yago:WikicatConjectures yago:Abstraction100002137 yago:Chemical114806838 yago:Cognition100023271 yago:Communication100033020 yago:Concept105835747 yago:Content105809192 yago:Equation106669864 yago:Fraction114922107 yago:Hypothesis105888929 yago:Idea105833840 yago:Material114580897 yago:MathematicalStatement106732169 yago:Matter100020827 yago:Message106598915 yago:Part113809207 yago:PhysicalEntity100001930 yago:PsychologicalFeature100023100 yago:Relation100031921 yago:Speculation105891783 yago:Statement106722453 yago:Substance100019613 yago:WikicatDiophantineEquations yago:WikicatEgyptianFractions yago:WikicatFractions
rdfs:label	Erdős-Straus-Vermutung (de) Erdős–Straus conjecture (en) Conjecture d'Erdős-Straus (fr) Congettura di Erdős-Straus (it) 에르되시-스트라우스 추측 (ko) Vermoeden van Erdős-Straus (nl) Гипотеза Эрдёша — Штрауса (ru) Erdős–Straus förmodan (sv) 歐德斯-史特勞斯猜想 (zh)
rdfs:comment	Die zahlentheoretische Erdős-Straus-Vermutung (nach den Mathematikern Paul Erdős und Ernst Gabor Straus) besagt, dass stets einer Summe von drei positiven Stammbrüchen entspricht. Sie wurde im Jahr 1948 aufgestellt und ist eine von vielen Vermutungen von Paul Erdős. (de) La conjecture d'Erdős-Straus énonce que tout nombre rationnel de la forme , avec n entier supérieur ou égal à 2, peut être écrit comme somme de trois fractions unitaires, c'est-à-dire qu'il existe trois entiers naturels non nuls et tels que : Louis Mordell a montré que pour la conjecture est vraie. (fr) 수론에서 1948년, 에르되시 팔과 (Ernst G. Straus)가 추측에 사용한 공식이다. 에르되시-스트라우스 추측(Erdős–Straus conjecture)이라고 한다. 정수에 대해서 n ≥ 2일때, 자연수 x, y, z의 해가 언제나 존재한다라고하는 것에 대한 추측이다. 예로, n = 5는 다음과 같은 2개의 해가 존재한다. 2013년, 테렌스 타오가 크리스티안 엘숄츠(Christian Elsholtz)와 함께 이 문제에대한 추측상의 출현 수 세기에 대한 논문을 발표했다. 수학의 미해결 문제이다. 또한 이것은 이라는 피타고라스의 정리의 연장선상에 있는 이라는 디오판토스의 방정식의 분수형태의 변형과 관계있다. (ko) Het vermoeden van Erdős-Straus is een nog niet bewezen vermoeden uit de getaltheorie dat stelt dat door welk getal groter dan 1 je 4 ook deelt, het quotiënt altijd de som van drie stambreuken is. Paul Erdős en stelden het vermoeden op in 1948. Het is een van de vele vermoedens van Erdős. Formeel luidt het vermoeden:voor iedere gehele geldt dat er positieve getallen zijn, zo dat (nl) Гипотеза Эрдёша — Штрауса — теоретико-числовая гипотеза, согласно которой для всех целых чисел рациональное число может быть представлено в виде суммы трёх аликвотных дробей (дробей с единицей в числителе), то есть существует три положительных целых числа , и , таких что: . Сформулирована в 1948 году Палом Эрдёшом и Эрнстом Штраусом. Перебором на компьютере проверено выполнение гипотезы для всех чисел вплоть до , но доказательство для всех остаётся по состоянию на 2015 год открытой проблемой. (ru) Inom talteori är Erdős–Straus förmodan en förmodan som säger att för alla heltal n ≥ 2 kan talet 4/n skrivas som summan av reciprokerna av tre positiva heltal. Paul Erdős och formulerade förmodandet år 1948. (sv) 歐德斯-史特勞斯猜想（Erdős–Straus conjecture），簡稱歐德斯猜想，是由匈牙利犹太数学家保罗·埃尔德什與德裔美國數學家於1948年共同提出的數論猜想，其陳述为：对于任何一个大于1的整数，都有。其中, , 为正整数。例如，若n = 1801，則存在一組 x = 451、y = 295364、z = 3249004 的解，使得在基本式子中，只需考慮 n = p 為素數的情況，因為若成立，則對於大於 1 的整數 m 也會成立。計算機已經驗證到 n ≤ 1014 的情況，但此猜想還是有待證明。 (zh) Unsolved problem in mathematics: Does have a positive integer solution for every integer ? (more unsolved problems in mathematics) The Erdős–Straus conjecture is an unproven statement in number theory. The conjecture is that, for every integer that is 2 or more, there exist positive integers , , and for which In other words, the number can be written as a sum of three positive unit fractions. If the conjecture is reframed to allow negative unit fractions, then it is known to be true. Generalizations of the conjecture to fractions with numerator 5 or larger have also been studied. (en) La congettura di Erdős-Straus afferma che per ogni intero , il numero razionale 4/n si può scrivere come somma di tre frazioni unitarie, ossia esistono tre interi positivi , e tali che La somma di queste frazioni unitarie è una rappresentazione come frazione egiziana del numero 4/n. Ad esempio, per n = 1801, esiste una soluzione con x = 451, y = 295364 e z = 3249004: Paul Erdős e formularono la congettura nel 1948 (vedi, ad esempio, Elsholtz) ma il primo riferimento divulgato sembra essere una pubblicazione di Erdős del 1950. (it)
dcterms:subject	Conjectures Egyptian fractions Diophantine equations Unsolved problems in number theory Paul Erdős
Wikipage page ID	2431002 (xsd:integer)
Wikipage revision ID	1124633220 (xsd:integer)
Link from a Wikipage to another Wikipage	Prime power List of sums of reciprocals Paul Erdős Upper bound Liber Abaci Conjectures Ancient Egyptian mathematics Ernst G. Straus Prime factor Quadratic residue Egyptian fraction Modular arithmetic Crux Mathematicorum Andrzej Schinzel Lower bound Composite number Proceedings of the American Mathematical Society Mathematika Vulgar fraction Wacław Sierpiński Hasse principle Hasse–Minkowski theorem János Bolyai Mathematical Society Open problem American Mathematical Monthly Egyptian fractions Fibonacci Number theory Journal of Number Theory Natural density Counterexample Covering system Prime number Arithmetic progression Asymptotic Diophantine equations Unsolved problems in number theory Chinese remainder theorem Egyptian mathematics Diophantine equation Bombieri–Vinogradov theorem Paul Erdős Polynomial Coprime Greedy algorithm for Egyptian fractions Integer Brun–Titchmarsh theorem Brute-force search Odd greedy expansion Odd number

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