Number Theory and Symmetry

According to Carl Friedrich Gauss (1777-1855), mathematics is the queen of the sciences-and number theory is the queen of mathematics. Numbers (integers, algebraic integers, transcendental numbers, p-adic numbers) and symmetries are investigated in the nine refereed papers of this MDPI issue. This b...

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Bibliographic Details
Other Authors:	Planat, Michel (Editor)
Format:	Book Chapter
Published:	Basel, Switzerland MDPI - Multidisciplinary Digital Publishing Institute 2020
Subjects:	Research & information: general Mathematics & science quantum computation IC-POVMs knot theory three-manifolds branch coverings Dehn surgeries zeta function Pólya-Hilbert conjecture Riemann interferometer prime numbers Prime Number Theorem (P.N.T.) modified Sieve procedure binary periodical sequences prime number function prime characteristic function limited intervals logarithmic integral estimations twin prime numbers free probability p-adic number fields ℚp Banach ∗-probability spaces C*-algebras semicircular elements the semicircular law asymptotic semicircular laws Kaprekar constants Kaprekar transformation fixed points for recursive functions Baker's theorem Gel'fond-Schneider theorem algebraic number transcendental number standard model of elementary particles 4-manifold topology particles as 3-Braids branched coverings knots and links charge as Hirzebruch defect umbral moonshine number of generations the pe-Pascal's triangle Lucas' result on the Pascal's triangle congruences of binomial expansions primality test Miller-Rabin primality test strong pseudoprimes primality witnesses
Online Access:	Get Fullteks DOAB: description of the publication
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020			\|a 9783039366866
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024	7		\|a 10.3390/books978-3-03936-687-3 \|c doi
041	0		\|a English
042			\|a dc
072		7	\|a GP \|2 bicssc
072		7	\|a P \|2 bicssc
100	1		\|a Planat, Michel \|4 edt
700	1		\|a Planat, Michel \|4 oth
245	1	0	\|a Number Theory and Symmetry
260			\|a Basel, Switzerland \|b MDPI - Multidisciplinary Digital Publishing Institute \|c 2020
300			\|a 1 electronic resource (206 p.)
506	0		\|a Open Access \|2 star \|f Unrestricted online access
520			\|a According to Carl Friedrich Gauss (1777-1855), mathematics is the queen of the sciences-and number theory is the queen of mathematics. Numbers (integers, algebraic integers, transcendental numbers, p-adic numbers) and symmetries are investigated in the nine refereed papers of this MDPI issue. This book shows how symmetry pervades number theory. In particular, it highlights connections between symmetry and number theory, quantum computing and elementary particles (thanks to 3-manifolds), and other branches of mathematics (such as probability spaces) and revisits standard subjects (such as the Sieve procedure, primality tests, and Pascal's triangle). The book should be of interest to all mathematicians, and physicists.
540			\|a Creative Commons \|f https://creativecommons.org/licenses/by/4.0/ \|2 cc \|4 https://creativecommons.org/licenses/by/4.0/
546			\|a English
650		7	\|a Research & information: general \|2 bicssc
650		7	\|a Mathematics & science \|2 bicssc
653			\|a quantum computation
653			\|a IC-POVMs
653			\|a knot theory
653			\|a three-manifolds
653			\|a branch coverings
653			\|a Dehn surgeries
653			\|a zeta function
653			\|a Pólya-Hilbert conjecture
653			\|a Riemann interferometer
653			\|a prime numbers
653			\|a Prime Number Theorem (P.N.T.)
653			\|a modified Sieve procedure
653			\|a binary periodical sequences
653			\|a prime number function
653			\|a prime characteristic function
653			\|a limited intervals
653			\|a logarithmic integral estimations
653			\|a twin prime numbers
653			\|a free probability
653			\|a p-adic number fields ℚp
653			\|a Banach ∗-probability spaces
653			\|a C*-algebras
653			\|a semicircular elements
653			\|a the semicircular law
653			\|a asymptotic semicircular laws
653			\|a Kaprekar constants
653			\|a Kaprekar transformation
653			\|a fixed points for recursive functions
653			\|a Baker's theorem
653			\|a Gel'fond-Schneider theorem
653			\|a algebraic number
653			\|a transcendental number
653			\|a standard model of elementary particles
653			\|a 4-manifold topology
653			\|a particles as 3-Braids
653			\|a branched coverings
653			\|a knots and links
653			\|a charge as Hirzebruch defect
653			\|a umbral moonshine
653			\|a number of generations
653			\|a the pe-Pascal's triangle
653			\|a Lucas' result on the Pascal's triangle
653			\|a congruences of binomial expansions
653			\|a primality test
653			\|a Miller-Rabin primality test
653			\|a strong pseudoprimes
653			\|a primality witnesses
856	4	0	\|a www.oapen.org \|u https://mdpi.com/books/pdfview/book/2717 \|7 0 \|z Get Fullteks
856	4	0	\|a www.oapen.org \|u https://directory.doabooks.org/handle/20.500.12854/68949 \|7 0 \|z DOAB: description of the publication

Number Theory and Symmetry

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