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Factoring Groups into Subsets

Sandor Szabo | Arthur D. Sands
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A01=Arthur D. Sands
A01=Sandor Szabo
abelian
Abelian Group
abelian groups
advanced combinatorial mathematics
Author_Arthur D. Sands
Author_Sandor Szabo
Category=PBG
Cayley Graph
combinatorics
Complementer Factor
Coset Representatives
cryptography
cyclic
Cyclic Group
Cyclic Subgroup
cyclotomic
Cyclotomic Polynomial
direct
Direct Sum
Distinct Prime Divisors
eq_isMigrated=1
eq_isMigrated=2
eq_nobargain
error correcting codes
Factor A1
Factor Bi
factorization
Factors Ai
finite
Finite Abelian Group
Finite Cyclic Group
Fourier Analysis
full
Full Rank Factorization
graphy theory
group theory applications
Hadmard matrices
infinite group factorization
Latin Square
mathematical tiling theory
Non-principal Character
normalized
Normalized Factorization
periodic subsets
polynomial
Prime Divisor
Prime Power Order
Ramsey theory
Residue Classes Modulo
Residues Modulo
subset factorization in mathematics
sum
Sum A1
Variable Length Codes
Ρ0 Ρ0 Ρ0 Ρ0 Ρ0

Product details

  • ISBN 9781420090468
  • Weight: 498g
  • Dimensions: 156 x 234mm
  • Publication Date: 21 Jan 2009
  • Publisher: Taylor & Francis Ltd
  • Publication City/Country: GB
  • Product Form: Paperback
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Description

Decomposing an abelian group into a direct sum of its subsets leads to results that can be applied to a variety of areas, such as number theory, geometry of tilings, coding theory, cryptography, graph theory, and Fourier analysis. Focusing mainly on cyclic groups, Factoring Groups into Subsets explores the factorization theory of abelian groups.

The book first shows how to construct new factorizations from old ones. The authors then discuss nonperiodic and periodic factorizations, quasiperiodicity, and the factoring of periodic subsets. They also examine how tiling plays an important role in number theory. The next several chapters cover factorizations of infinite abelian groups; combinatorics, such as Ramsey numbers, Latin squares, and complex Hadamard matrices; and connections with codes, including variable length codes, error correcting codes, and integer codes. The final chapter deals with several classical problems of Fuchs.

Encompassing many of the main areas of the factorization theory, this book explores problems in which the underlying factored group is cyclic.

About Arthur D. Sands | Sandor Szabo
University of Pecs, Pecs, Hungary University of Dundee, Dundee, Scotland, UK Rutgers University, Piscataway, New Jersey, USA

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