Pseudodifferential Analysis, Automorphic Distributions in the Plane and Modular Forms

Buch | Softcover
VIII, 300 Seiten
2011 | 2011
Springer Basel (Verlag)
978-3-0348-0165-2 (ISBN)

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Pseudodifferential Analysis, Automorphic Distributions in the Plane and Modular Forms - André Unterberger
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Pseudodifferential analysis, introduced in this book in a way adapted to the needs of number theorists, relates automorphic function theory in the hyperbolic half-plane to automorphic distribution theory in the plane. Spectral-theoretic questions are discussed in one or the other environment: in the latter one, the problem of decomposing automorphic functions in according to the spectral decomposition of the modular Laplacian gives way to the simpler one of decomposing automorphic distributions in R2 into homogeneous components. The Poincaré summation process, which consists in building automorphic distributions as series of g-transforms, for g E SL(2;Z), of some initial function, say in S(R2), is analyzed in detail. On , a large class of new automorphic functions or measures is built in the same way: one of its features lies in an interpretation, as a spectral density, of the restriction of the zeta function to any line within the critical strip.

The book is addressed to a wide audience of advanced graduate students and researchers working in analytic number theory or pseudo-differential analysis.

Introduction.- The Weyl calculus.- The Radon transformation and applications.- Automorphic functions and automorphic distributions.- A class of Poincaré series.- Spectral decomposition of the Poincaré summation process.- The totally radial Weyl calculus and arithmetic.- Should one generalize the Weyl calculus to an adelic setting?.- Index of notation.- Subject Index.- Bibliography.

From the reviews:

"The book is devoted to explaining a close relationship between the pseudodifferential analysis and the well-known theory of automorphic functions and modular forms on the upper Poincaré half-plane II, or their generalization as automorphic distributions. ... the book is perfectly readable and rich with analytic details for both researchers in pseudodifferential analysis and for number theorists." ( Ng c Di p, Mathematical Reviews, November, 2013)

"In this book the author explains very beautiful links between pseudodifferential analysis and the theory of nonholomorphic modular forms on the classical modular group ... . The book is excellently written and represents an extremely valuable contribution for the two research communities - analysts from PDEs and pseudodifferential operators and number theorists. It exhibits a lot of new and original links between the two research areas. It is self-contained and easily accessible for a broad readership." (Sören Kraußhar, Zentralblatt MATH, Vol. 1243, 2012)

Erscheint lt. Verlag 6.8.2011
Reihe/Serie Pseudo-Differential Operators
Zusatzinfo VIII, 300 p.
Verlagsort Basel
Sprache englisch
Maße 168 x 240 mm
Gewicht 520 g
Themenwelt Mathematik / Informatik Mathematik Analysis
Mathematik / Informatik Mathematik Arithmetik / Zahlentheorie
Mathematik / Informatik Mathematik Wahrscheinlichkeit / Kombinatorik
ISBN-10 3-0348-0165-3 / 3034801653
ISBN-13 978-3-0348-0165-2 / 9783034801652
Zustand Neuware
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