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Number Theory, Analysis and Geometry - In Memory of Serge Lang (Hardcover, 2012 ed.): Dorian Goldfeld, Jay Jorgenson, Peter... Number Theory, Analysis and Geometry - In Memory of Serge Lang (Hardcover, 2012 ed.)
Dorian Goldfeld, Jay Jorgenson, Peter Jones, Dinakar Ramakrishnan, Kenneth Ribet, …
R4,885 R4,317 Discovery Miles 43 170 Save R568 (12%) Ships in 12 - 17 working days

Serge Lang was an iconic figure in mathematics, both for his own important work and for the indelible impact he left on the field of mathematics, on his students, and on his colleagues. Over the course of his career, Lang traversed a tremendous amount of mathematical ground. As he moved from subject to subject, he found analogies that led to important questions in such areas as number theory, arithmetic geometry, and the theory of negatively curved spaces. Lang's conjectures will keep many mathematicians occupied far into the future. In the spirit of Lang's vast contribution to mathematics, this memorial volume contains articles by prominent mathematicians in a variety of areas of the field, namely Number Theory, Analysis, and Geometry, representing Lang's own breadth of interest and impact. A special introduction by John Tate includes a brief and fascinating account of the Serge Lang's life. This volume's group of 6 editors are also highly prominent mathematicians and were close to Serge Lang, both academically and personally. The volume is suitable to research mathematicians in the areas of Number Theory, Analysis, and Geometry.

The Heat Kernel and Theta Inversion on SL2(C) (Hardcover, 2008 ed.): Jay Jorgenson, Serge Lang The Heat Kernel and Theta Inversion on SL2(C) (Hardcover, 2008 ed.)
Jay Jorgenson, Serge Lang
R2,830 Discovery Miles 28 300 Ships in 10 - 15 working days

The worthy purpose of this text is to provide a complete, self-contained development of the trace formula and theta inversion formula for SL(2, Z i])\SL(2, C). Unlike other treatments of the theory, the approach taken here is to begin with the heat kernel on SL(2, C) associated to the invariant Laplacian, which is derived using spherical inversion. The heat kernel on the quotient space SL(2, Z i])\SL(2, C) is arrived at through periodization, and further expanded in an eigenfunction expansion. A theta inversion formula is obtained by studying the trace of the heat kernel. Following the author's previous work, the inversion formula then leads to zeta functions through the Gauss transform.

Spherical Inversion on SLn(R) (Hardcover, 2001 ed.): Jay Jorgenson, Serge Lang Spherical Inversion on SLn(R) (Hardcover, 2001 ed.)
Jay Jorgenson, Serge Lang
R2,873 Discovery Miles 28 730 Ships in 10 - 15 working days

Harish-Chandra¿s general Plancherel inversion theorem admits a much shorter presentation for spherical functions. Previous expositions have dealt with a general, wide class of Lie groups. This has made access to the subject difficult for outsiders, who may wish to connect some aspects with several if not all other parts of mathematics. In this book, the essential features of Harish-Chandra theory are exhibited on SLn(R), but hundreds of pages of background are replaced by short direct verifications. The material is accessible to graduate students with no background in Lie groups and representation theory.

Number Theory, Analysis and Geometry - In Memory of Serge Lang (Paperback, 2012 ed.): Dorian Goldfeld, Jay Jorgenson, Peter... Number Theory, Analysis and Geometry - In Memory of Serge Lang (Paperback, 2012 ed.)
Dorian Goldfeld, Jay Jorgenson, Peter Jones, Dinakar Ramakrishnan, Kenneth Ribet, …
R4,353 Discovery Miles 43 530 Ships in 10 - 15 working days

Serge Lang was an iconic figure in mathematics, both for his own important work and for the indelible impact he left on the field of mathematics, on his students, and on his colleagues. Over the course of his career, Lang traversed a tremendous amount of mathematical ground. As he moved from subject to subject, he found analogies that led to important questions in such areas as number theory, arithmetic geometry, and the theory of negatively curved spaces. Lang's conjectures will keep many mathematicians occupied far into the future. In the spirit of Lang's vast contribution to mathematics, this memorial volume contains articles by prominent mathematicians in a variety of areas of the field, namely Number Theory, Analysis, and Geometry, representing Lang's own breadth of interest and impact. A special introduction by John Tate includes a brief and fascinating account of the Serge Lang's life. This volume's group of 6 editors are also highly prominent mathematicians and were close to Serge Lang, both academically and personally. The volume is suitable to research mathematicians in the areas of Number Theory, Analysis, and Geometry.

Spherical Inversion on SLn(R) (Paperback, Softcover reprint of the original 1st ed. 2001): Jay Jorgenson, Serge Lang Spherical Inversion on SLn(R) (Paperback, Softcover reprint of the original 1st ed. 2001)
Jay Jorgenson, Serge Lang
R2,833 Discovery Miles 28 330 Ships in 10 - 15 working days

Harish-Chandra s general Plancherel inversion theorem admits a much shorter presentation for spherical functions. Previous expositions have dealt with a general, wide class of Lie groups. This has made access to the subject difficult for outsiders, who may wish to connect some aspects with several if not all other parts of mathematics. In this book, the essential features of Harish-Chandra theory are exhibited on SLn(R), but hundreds of pages of background are replaced by short direct verifications. The material is accessible to graduate students with no background in Lie groups and representation theory."

The Heat Kernel and Theta Inversion on SL2(C) (Paperback, Softcover reprint of hardcover 1st ed. 2008): Jay Jorgenson, Serge... The Heat Kernel and Theta Inversion on SL2(C) (Paperback, Softcover reprint of hardcover 1st ed. 2008)
Jay Jorgenson, Serge Lang
R2,800 Discovery Miles 28 000 Ships in 10 - 15 working days

The worthy purpose of this text is to provide a complete, self-contained development of the trace formula and theta inversion formula for SL(2, Z i])\SL(2, C). Unlike other treatments of the theory, the approach taken here is to begin with the heat kernel on SL(2, C) associated to the invariant Laplacian, which is derived using spherical inversion. The heat kernel on the quotient space SL(2, Z i])\SL(2, C) is arrived at through periodization, and further expanded in an eigenfunction expansion. A theta inversion formula is obtained by studying the trace of the heat kernel. Following the author's previous work, the inversion formula then leads to zeta functions through the Gauss transform.

Posn(R) and Eisenstein Series (Paperback, 2005 ed.): Jay Jorgenson, Serge Lang Posn(R) and Eisenstein Series (Paperback, 2005 ed.)
Jay Jorgenson, Serge Lang
R1,375 Discovery Miles 13 750 Ships in 10 - 15 working days

Posn(R) and Eisenstein Series provides an introduction, requiring minimal prerequisites, to the analysis on symmetric spaces of positive definite real matrices as well as quotients of this space by the unimodular group of integral matrices. The approach is presented in very classical terms and includes material on special functions, notably gamma and Bessel functions, and focuses on certain mathematical aspects of Eisenstein series.

Explicit Formulas - for Regularized Products and Series (Paperback, 1994 ed.): Jay Jorgenson Explicit Formulas - for Regularized Products and Series (Paperback, 1994 ed.)
Jay Jorgenson; Appendix by Dorian Goldfeld; Serge Lang, Dorian Goldfeld
R1,125 Discovery Miles 11 250 Ships in 10 - 15 working days

The theory of explicit formulas for regularized products and series forms a natural continuation of the analytic theory developed in LNM 1564. These explicit formulas can be used to describe the quantitative behavior of various objects in analytic number theory and spectral theory. The present book deals with other applications arising from Gaussian test functions, leading to theta inversion formulas and corresponding new types of zeta functions which are Gaussian transforms of theta series rather than Mellin transforms, and satisfy additive functional equations. Their wide range of applications includes the spectral theory of a broad class of manifolds and also the theory of zeta functions in number theory and representation theory. Here the hyperbolic 3-manifolds are given as a significant example.

Basic Analysis of Regularized Series and Products (Paperback, 1993 ed.): Jay Jorgenson, Serge Lang Basic Analysis of Regularized Series and Products (Paperback, 1993 ed.)
Jay Jorgenson, Serge Lang
R1,109 Discovery Miles 11 090 Ships in 10 - 15 working days

Analytic number theory and part of the spectral theory of operators (differential, pseudo-differential, elliptic, etc.) are being merged under amore general analytic theory of regularized products of certain sequences satisfying a few basic axioms. The most basic examples consist of the sequence of natural numbers, the sequence of zeros with positive imaginary part of the Riemann zeta function, and the sequence of eigenvalues, say of a positive Laplacian on a compact or certain cases of non-compact manifolds. The resulting theory is applicable to ergodic theory and dynamical systems; to the zeta and L-functions of number theory or representation theory and modular forms; to Selberg-like zeta functions; andto the theory of regularized determinants familiar in physics and other parts of mathematics. Aside from presenting a systematic account of widely scattered results, the theory also provides new results. One part of the theory deals with complex analytic properties, and another part deals with Fourier analysis. Typical examples are given. This LNM provides basic results which are and will be used in further papers, starting with a general formulation of Cram r's theorem and explicit formulas. The exposition is self-contained (except for far-reaching examples), requiring only standard knowledge of analysis.

Automorphic Forms and Related Topics (Paperback): Samuele Anni, Jay Jorgenson, Lejla Smajlovic, Lynne Walling Automorphic Forms and Related Topics (Paperback)
Samuele Anni, Jay Jorgenson, Lejla Smajlovic, Lynne Walling
R3,718 Discovery Miles 37 180 Ships in 9 - 15 working days

This volume contains the proceedings of the Building Bridges: 3rd EU/US Summer School and Workshop on Automorphic Forms and Related Topics, which was held in Sarajevo from July 11-22, 2016. The articles summarize material which was presented during the lectures and speed talks during the workshop. These articles address various aspects of the theory of automorphic forms and its relations with the theory of $L$-functions, the theory of elliptic curves, and representation theory. In addition to mathematical content, the workshop held a panel discussion on diversity and inclusion, which was chaired by a social scientist who has contributed to this volume as well. This volume is intended for researchers interested in expanding their own areas of focus, thus allowing them to ``build bridges'' to mathematical questions in other fields.

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