Modern Spherical Functions
Title | Modern Spherical Functions PDF eBook |
Author | Masaru Takeuchi |
Publisher | American Mathematical Soc. |
Pages | 286 |
Release | 1994 |
Genre | Spherical functions |
ISBN | 9780821845806 |
This book presents an exposition of spherical functions on compact symmetric spaces, from the viewpoint of Cartan-Selberg. Representation theory, invariant differential operators, and invariant integral operators play an important role in the exposition. The author treats compact symmetric pairs, spherical representations for compact symmetric pairs, the fundamental groups of compact symmetric spaces, and the radial part of an invariant differential operator. Also explored are the classical results for spheres and complex projective spaces and the relation between spherical functions and harmonic polynomials. This book is suitable as a graduate textbook.
Harmonic Analysis of Spherical Functions on Real Reductive Groups
Title | Harmonic Analysis of Spherical Functions on Real Reductive Groups PDF eBook |
Author | Ramesh Gangolli |
Publisher | Springer Science & Business Media |
Pages | 379 |
Release | 2012-12-06 |
Genre | Mathematics |
ISBN | 3642729568 |
Analysis on Symmetric spaces, or more generally, on homogeneous spaces of semisimple Lie groups, is a subject that has undergone a vigorous development in recent years, and has become a central part of contemporary mathematics. This is only to be expected, since homogeneous spaces and group representations arise naturally in diverse contexts ranging from Number theory and Geometry to Particle Physics and Polymer Chemistry. Its explosive growth sometimes makes it difficult to realize that it is actually relatively young as mathematical theories go. The early ideas in the subject (as is the case with many others) go back to Elie Cart an and Hermann Weyl who studied the compact symmetric spaces in the 1930's. However its full development did not begin until the 1950's when Gel'fand and Harish Chandra dared to dream of a theory of representations that included all semisimple Lie groups. Harish-Chandra's theory of spherical functions was essentially complete in the late 1950's, and was to prove to be the forerunner of his monumental work on harmonic analysis on reductive groups that has inspired a whole generation of mathematicians. It is the harmonic analysis of spherical functions on symmetric spaces, that is at the focus of this book. The fundamental questions of harmonic analysis on symmetric spaces involve an interplay of the geometric, analytical, and algebraic aspects of these spaces. They have therefore attracted a great deal of attention, and there have been many excellent expositions of the themes that are characteristic of this subject.
Spherical Harmonics and Approximations on the Unit Sphere: An Introduction
Title | Spherical Harmonics and Approximations on the Unit Sphere: An Introduction PDF eBook |
Author | Kendall Atkinson |
Publisher | Springer Science & Business Media |
Pages | 253 |
Release | 2012-02-17 |
Genre | Mathematics |
ISBN | 3642259820 |
These notes provide an introduction to the theory of spherical harmonics in an arbitrary dimension as well as an overview of classical and recent results on some aspects of the approximation of functions by spherical polynomials and numerical integration over the unit sphere. The notes are intended for graduate students in the mathematical sciences and researchers who are interested in solving problems involving partial differential and integral equations on the unit sphere, especially on the unit sphere in three-dimensional Euclidean space. Some related work for approximation on the unit disk in the plane is also briefly discussed, with results being generalizable to the unit ball in more dimensions.
Spherical Functions of Mathematical Geosciences
Title | Spherical Functions of Mathematical Geosciences PDF eBook |
Author | Willi Freeden |
Publisher | Springer Science & Business Media |
Pages | 609 |
Release | 2008-12-14 |
Genre | Science |
ISBN | 3540851127 |
In recent years, the Geomathematics Group, TU Kaiserslautern, has worked to set up a theory of spherical functions of mathematical physics. This book is a collection of all the material that group generated during the process.
Heavenly Mathematics
Title | Heavenly Mathematics PDF eBook |
Author | Glen Van Brummelen |
Publisher | Princeton University Press |
Pages | 208 |
Release | 2017-04-04 |
Genre | Mathematics |
ISBN | 0691175993 |
"Spherical trigonometry was at the heart of astronomy and ocean-going navigation for two millennia. The discipline was a mainstay of mathematics education for centuries, and it was a standard subject in high schools until the 1950s. Today, however, it is rarely taught. Heavenly Mathematics traces the rich history of this forgotten art, revealing how the cultures of classical Greece, medieval Islam, and the modern West used spherical trigonometry to chart the heavens and the Earth."--Jacket.
C * -Algebras and Elliptic Operators in Differential Topology
Title | C * -Algebras and Elliptic Operators in Differential Topology PDF eBook |
Author | I_U_ri_ Petrovich Solov_v Evgeni_ Vadimovich Troit_s_ki_ |
Publisher | American Mathematical Soc. |
Pages | 236 |
Release | 2000-10-03 |
Genre | Mathematics |
ISBN | 9780821897935 |
The aim of this book is to present some applications of functional analysis and the theory of differential operators to the investigation of topological invariants of manifolds. The main topological application discussed in the book concerns the problem of the description of homotopy-invariant rational Pontryagin numbers of non-simply connected manifolds and the Novikov conjecture of homotopy invariance of higher signatures. The definition of higher signatures and the formulation of the Novikov conjecture are given in Chapter 3. In this chapter, the authors also give an overview of different approaches to the proof of the Novikov conjecture. First, there is the Mishchenko symmetric signature and the generalized Hirzebruch formulae and the Mishchenko theorem of homotopy invariance of higher signatures for manifolds whose fundamental groups have a classifying space, being a complete Riemannian non-positive curvature manifold. Then the authors present Solovyov's proof of the Novikov conjecture for manifolds with fundamental group isomorphic to a discrete subgroup of a linear algebraic group over a local field, based on the notion of the Bruhat-Tits building. Finally, the authors discuss the approach due to Kasparov based on the operator $KK$-theory and another proof of the Mishchenko theorem. In Chapter 4, they outline the approach to the Novikov conjecture due to Connes and Moscovici involving cyclic homology. That allows one to prove the conjecture in the case when the fundamental group is a (Gromov) hyperbolic group. The text provides a concise exposition of some topics from functional analysis (for instance, $C^*$-Hilbert modules, $K$-theory or $C^*$-bundles, Hermitian $K$-theory, Fredholm representations, $KK$-theory, and functional integration) from the theory of differential operators (pseudodifferential calculus and Sobolev chains over $C^*$-algebras), and from differential topology (characteristic classes). The book explains basic ideas of the subject and can serve as a course text for an introduction to the study of original works and special monographs.
Introduction to Complex Analysis
Title | Introduction to Complex Analysis PDF eBook |
Author | Junjiro Noguchi |
Publisher | American Mathematical Soc. |
Pages | 268 |
Release | 2008-04-09 |
Genre | Mathematics |
ISBN | 9780821889602 |
This book describes a classical introductory part of complex analysis for university students in the sciences and engineering and could serve as a text or reference book. It places emphasis on rigorous proofs, presenting the subject as a fundamental mathematical theory. The volume begins with a problem dealing with curves related to Cauchy's integral theorem. To deal with it rigorously, the author gives detailed descriptions of the homotopy of plane curves. Since the residue theorem is important in both pure and applied mathematics, the author gives a fairly detailed explanation of how to apply it to numerical calculations; this should be sufficient for those who are studying complex analysis as a tool.