Mersenne numbers and fermat numbers [electronic resource] / Elena Deza, Moscow State Pedagogical University, Russia.

"This book contains a complete detailed description of two classes of special numbers closely related to classical problems of the Theory of Primes. There is also extensive discussions of applied issues related to Cryptography. In Mathematics, a Mersenne number (named after Marin Mersenne, who studi...

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Bibliographic Details
Main Author:	Deza, Elena (Author)
Language:	English
Published:	New Jersey : World Scientific, [2022]
Series:	Selected chapters of number theory : special numbers ; Vol. 1
Subjects:	Numbers, Prime. Number theory.
Online Access:	EBSCO eBooks: 2021 (EBSCO)
Format:	Electronic eBook

MARC


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100	1		\|a Deza, Elena, \|e author.
245	1	0	\|a Mersenne numbers and fermat numbers \|h [electronic resource] / \|c Elena Deza, Moscow State Pedagogical University, Russia.
264		1	\|a New Jersey : \|b World Scientific, \|c [2022]
490	0		\|a Selected chapters of number theory : special numbers ; \|v Vol. 1
504			\|a Includes bibliographical references and index.
520			\|a "This book contains a complete detailed description of two classes of special numbers closely related to classical problems of the Theory of Primes. There is also extensive discussions of applied issues related to Cryptography. In Mathematics, a Mersenne number (named after Marin Mersenne, who studied them in the early 17-th century) is a number of the form Mn = 2n - 1 for positive integer n. In Mathematics, a Fermat number (named after Pierre de Fermat who first studied them) is a positive integer of the form Fn = 2k+ 1, k = 2n, where n is a non-negative integer. Mersenne and Fermat numbers have many other interesting properties. Long and rich history, many arithmetic connections (with perfect numbers, with construction of regular polygons etc.), numerous modern applications, long list of open problems allow us to provide a broad perspective of the Theory of these two classes of special numbers, that can be useful and interesting for both professionals and the general audience"-- \|c Provided by publisher.
650		0	\|a Numbers, Prime.
650		0	\|a Number theory.
773	0		\|t EBSCO eBooks \|d EBSCO
776	0	8	\|i Online version: \|a Deza, Elena. \|t Mersenne numbers and fermat numbers \|d Hackensack : World Scientific, 2021 \|z 9789811230325 \|w (DLC) 2021033421
776	1		\|t Mersenne numbers and fermat numbers / \|w (DLC)2021033420
856	4	0	\|y Access Content Online(from EBSCO eBooks) \|u https://ezproxy.msu.edu/login?url=https://search.ebscohost.com/login.aspx?direct=true&scope=site&db=nlebk&AN=3009999 \|z EBSCO eBooks: 2021