Erdős conjecture
2024年3月18日 — Let $f(n)$ be the maximum number of edges in a graph on $n$ vertices in which no two cycles have the same length. In 1975, Erdos raised the ... ,2022年3月14日 — The meaning of Erdős' conjecture. The conjecture is concerned with so-called Steiner triple systems. Assume seven people want to form triples. ,It states that if the sum of the reciprocals of the members of a set A of positive integers diverges, then A contains arbitrarily long arithmetic progressions.,由 GW Peck 著作 · 1980 · 被引用 13 次 — A conjecture of Erdös that a set of n distinct numbers having the most linear combinations with coefficients 0,1 all equal are n integers of smallest ... ,The prolific mathematician Paul Erdős and his various collaborators made many famous mathematical conjectures, over a wide field of subjects, ... ,2022年6月6日 — Oxford Mathematician Jared Duker Lichtman explains his fascination and frustration with a conjecture that has puzzled mathematicians for ... ,,2020年7月3日 — It is a classical theorem that non-deficient numbers have a well-defined, positive asymptotic density. This was originally proven with heavy ...,由 JD Lichtman 著作 · 2022 · 被引用 5 次 — Abstract:A set of integers greater than 1 is primitive if no member in the set divides another. Erdős proved in 1935 that the series f(A) ... ,由 YG Chen 著作 · 2023 — In this paper, we prove that -mathcalU} is not a union of finitely many infinite arithmetic progressions and a set of asymptotic density zero.
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 Erdős conjecture 相關參考資料
(PDF) Erdos conjecture
2024年3月18日 — Let $f(n)$ be the maximum number of edges in a graph on $n$ vertices in which no two cycles have the same length. In 1975, Erdos raised the ... https://www.researchgate.net Decades-Old Erdős Conjecture Cracked
2022年3月14日 — The meaning of Erdős' conjecture. The conjecture is concerned with so-called Steiner triple systems. Assume seven people want to form triples. https://ist.ac.at Erdős conjecture on arithmetic progressions
It states that if the sum of the reciprocals of the members of a set A of positive integers diverges, then A contains arbitrarily long arithmetic progressions. https://en.wikipedia.org Erdös Conjecture on Sums of Distinct Numbers - Peck - 1980
由 GW Peck 著作 · 1980 · 被引用 13 次 — A conjecture of Erdös that a set of n distinct numbers having the most linear combinations with coefficients 0,1 all equal are n integers of smallest ... https://onlinelibrary.wiley.co List of conjectures by Paul Erdős
The prolific mathematician Paul Erdős and his various collaborators made many famous mathematical conjectures, over a wide field of subjects, ... https://en.wikipedia.org Oxford graduate student proves decades old Erdős ...
2022年6月6日 — Oxford Mathematician Jared Duker Lichtman explains his fascination and frustration with a conjecture that has puzzled mathematicians for ... https://www.maths.ox.ac.uk Primes and Primitive Sets (an Erdős Conjecture is cracked ...
https://www.youtube.com The Erdős primitive set conjecture - Mathematical Institute
2020年7月3日 — It is a classical theorem that non-deficient numbers have a well-defined, positive asymptotic density. This was originally proven with heavy ... https://www.maths.ox.ac.uk [2202.02384] A proof of the Erdős primitive set conjecture
由 JD Lichtman 著作 · 2022 · 被引用 5 次 — Abstract:A set of integers greater than 1 is primitive if no member in the set divides another. Erdős proved in 1935 that the series f(A) ... https://arxiv.org [2312.04120] A conjecture of Erdős on $p+2^k$
由 YG Chen 著作 · 2023 — In this paper, we prove that -mathcalU} is not a union of finitely many infinite arithmetic progressions and a set of asymptotic density zero. https://arxiv.org |