Diophantine approximation and dirichlet series

By:

Queffélec, Hervé

Contributor(s):

Queffélec, Martine [Co-author]

Series: Text and Readings in MathematicsPublication details: Hindustan Book Agency, 2021 New Delhi:Edition: 2nd edDescription: ix, 287p ; pb. ; 24cmISBN:

9789386279828

Subject(s):

DDC classification:

512.73 QUE

Summary: The second edition of the book includes a new chapter on the study of composition operators on the Hardy space and their complete characterization by Gordon and Hedenmalm. The book is devoted to Diophantine approximation, the analytic theory of Dirichlet series and their composition operators, and connections between these two domains which often occur through the Kronecker approximation theorem and the Bohr lift. The book initially discusses Harmonic analysis, including a sharp form of the uncertainty principle, Ergodic theory and Diophantine approximation, basics on continued fractions expansions, and the mixing property of the Gauss map and goes on to present the general theory of Dirichlet series with classes of examples connected to continued fractions, Bohr lift, sharp forms of the Bohnenblust-Hille theorem, Hardy-Dirichlet spaces, composition operators of the Hardy-Dirichlet space, and much more. Proofs throughout the book mix Hilbertian geometry, complex and harmonic analysis, number theory, and ergodic theory, featuring the richness of analytic theory of Dirichlet series. This self-contained book benefits beginners as well as researchers

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Holdings
Item type	Current library	Collection	Call number	Copy number	Status	Date due	Barcode
Books	IIT Gandhinagar General Stacks	General	512.73 QUE (Browse shelf(Opens below))	1	Available		030670

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Previous	512.73 HAL Sieve methods	512.73 HAR Prime-detecting Sieves	512.73 MUR Problems in analytic number theory	512.73 QUE Diophantine approximation and dirichlet series	512.74 ASH Course in algebraic number theory	512.74 GOL Automorphic forms and L-functions for the group GL(n,R)	512.74 HAD Field theory and its classical problems, vol.19	Next

Includes bibliography and index

The second edition of the book includes a new chapter on the study of composition operators on the Hardy space and their complete characterization by Gordon and Hedenmalm. The book is devoted to Diophantine approximation, the analytic theory of Dirichlet series and their composition operators, and connections between these two domains which often occur through the Kronecker approximation theorem and the Bohr lift. The book initially discusses Harmonic analysis, including a sharp form of the uncertainty principle, Ergodic theory and Diophantine approximation, basics on continued fractions expansions, and the mixing property of the Gauss map and goes on to present the general theory of Dirichlet series with classes of examples connected to continued fractions, Bohr lift, sharp forms of the Bohnenblust-Hille theorem, Hardy-Dirichlet spaces, composition operators of the Hardy-Dirichlet space, and much more. Proofs throughout the book mix Hilbertian geometry, complex and harmonic analysis, number theory, and ergodic theory, featuring the richness of analytic theory of Dirichlet series. This self-contained book benefits beginners as well as researchers

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