Numerical and Statistical Analysis of Aliquot Sequences

Chum, Kevin; Guy, Richard K.; Jacobson, Michael J.; Mosunov, Anton

doi:10.1080/10586458.2018.1477077

Cited by 6 publications

(7 citation statements)

References 13 publications

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“…This was more or less predicted by Guy's calculations and heuristic models using Markov chains. The theory continues for 𝑠(𝑠(2𝑛))/𝑠(2𝑛), but beyond the second iterate we only have these heuristics, [7]. Richard intrigued bright young minds into working on this problem for over 40 years, and at one point described it as his favorite problem.…”

Section: Number Theorymentioning

confidence: 99%

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The Man Who Loved Problems: Richard K. Guy

Granville¹,

Pomerance²

2022

Notices Amer. Math. Soc.

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Section: Number Theorymentioning

confidence: 99%

“…Guy proved several conjectures on crossing numbers for different families of graphs. He also 7 From an essay of Ted Bisztriczky in a collection of Guy remembrances in the CMS Notes, September, 2020. looked at the slimming number, the minimal number of edges one needs to remove to make 𝐺 planar.…”

Section: Geometry or Number Theory?mentioning

confidence: 99%

The Man Who Loved Problems: Richard K. Guy

Granville¹,

Pomerance²

2022

Notices Amer. Math. Soc.

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“…From a combination of theory and numerical evidence, Guy and Selfridge made a counter‐conjecture, that

\lbrace s^k(n)\rbrace _{k=1}^\infty

diverges for many, if not all, even

n

. Richard's last paper [129] co‐authored with some computer scientists, provided much stronger numerical evidence of this, including investigating 8000 sequences with randomly selected initial numbers until they terminated or exceeded

2^{888}

.…”

Section: Mathematical Workmentioning

confidence: 99%

“…Catalan in 1888, with a modification by Dickson in 1913, had conjectured that all such sequences terminate, that is reach a prime 𝑝, so that 𝑠(𝑝) = 1, or become periodic. From a combination of theory and numerical evidence, Guy and Selfridge made a counter-conjecture, that {𝑠 𝑘 (𝑛)} ∞ 𝑘=1 diverges for many, if not all, even 𝑛. Richard's last paper [129] co-authored with some computer scientists, provided much stronger numerical evidence of this, including investigating 8000 sequences with randomly selected initial numbers until they terminated or exceeded 2 888 .…”

Section: Number Theorymentioning

confidence: 99%

Richard Kenneth Guy, 1916–2020

Falconer

2022

Bulletin of London Math Soc

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Richard Guy was born in Nuneaton on 30 September 1916 to Augusta Adeline Tanner and William Alexander Charles Guy, both school teachers, his father having survived the disastrous Gallipoli campaign. He was a border at Warwick School, where he was put in classes well above his age group. Richard's mathematical talent was apparent from an early age and he was encouraged by his teacher Cyril Caton to study beyond the school syllabus. When 17, he purchased, and was fascinated by, Dickson's History of the Theory of Numbers 〈2〉, and he was left in no doubt that mathematics would be central to his life. Obtaining three scholarships, he went up to Gonville and Caius, Cambridge in 1935 to read Mathematics, and found that he was already familiar with all the first-year material. He recalls that later courses by Albert Ingham and Charles Burkill on number theory and analysis were particularly inspiring. However, he spent a considerable time playing chess and bridge and composing chess problems, with the consequence that he graduated in 1938 with only a secondclass degree, but also perhaps having fueled his lifetime interest in game theory.Michael Thirian, a couple of years below Richard at Warwick School, also won a scholarship to Gonville and Caius, and through him Richard met his sister, Louise Thirian. Louise and Michael were close siblings, for example in their teens they went on a three-week hiking trip in the Swiss Alps, covering up to 25 miles a day, and living very frugally. Louise took a teaching diploma at a Domestic Science College in Leicester; whilst there she invited Richard to a college dance, and this was soon followed by a trip together to the Lake District, where Richard had enjoyed walking holidays with his family. Richard and Louise became engaged in November 1939, and they married in December 1940.Meanwhile, against the advice of his parents, Richard decided to become a teacher. He gained a teaching diploma at the University of Birmingham, and in 1939 took up a mathematics post at Stockport Grammar School. He was not called up until 1941 when he was commissioned as a flight lieutenant in the meteorological branch of the RAF, and was posted first in Scotland, then Iceland, and finally Bermuda. Whilst in Iceland he took up snow and ice climbing, and skiing, which became lifelong pastimes.

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“…In terms of data analysis technology, the behavior features of online learners are usually mined from multi-dimensional data on their participation, interaction, and psychological features, through statistical analysis [7], sequence analysis [8], association rule mining [9], social network analysis [10]. Considering the features of online learning, Wang et al [11] proposed an ant colony optimization (ACO) algorithm, in which the pheromone concentration is adjusted step by step, to optimize the recommendation of learning path and predict the learning performance in future.…”

Section: Literature Reviewmentioning

confidence: 99%

An Early-Warning Model for Online Learners Based on User Portrait

Sun¹,

Chai²

2020

ISI

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In the age of the Internet, online learning is an important learning strategy. At present, a large number of data on learning behavior have been generated on various online education platforms. It is difficult to grasp the learning situation of the numerous learners of these platforms according to the massive data. User portrait offers a possible solution to the problem. This paper firstly classifies the portrait of online learners into three dimensions, and constructs the tag system of learner portrait based on the data fields of online learning platform. Then, the learning behavior data of online learners were analyzed in details. Online learners were divided into multiple groups through data mining, and the learner portrait was generated. From the five dimensions of learner portrait, the learning situation was analyzed to master the learning information of learners. Based on the analysis results, the four-dimensional early-warning of learning situation was realized through sequence analysis and association rule mining. The research results provide a good reference for the improvement of online learning.

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Numerical and Statistical Analysis of Aliquot Sequences

Cited by 6 publications

References 13 publications

The Man Who Loved Problems: Richard K. Guy

The Man Who Loved Problems: Richard K. Guy

Richard Kenneth Guy, 1916–2020

An Early-Warning Model for Online Learners Based on User Portrait

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