Harmonic Analysis on Semigroups
Title | Harmonic Analysis on Semigroups PDF eBook |
Author | C. van den Berg |
Publisher | Springer Science & Business Media |
Pages | 299 |
Release | 2012-12-06 |
Genre | Mathematics |
ISBN | 146121128X |
The Fourier transform and the Laplace transform of a positive measure share, together with its moment sequence, a positive definiteness property which under certain regularity assumptions is characteristic for such expressions. This is formulated in exact terms in the famous theorems of Bochner, Bernstein-Widder and Hamburger. All three theorems can be viewed as special cases of a general theorem about functions qJ on abelian semigroups with involution (S, +, *) which are positive definite in the sense that the matrix (qJ(sJ + Sk» is positive definite for all finite choices of elements St, . . . , Sn from S. The three basic results mentioned above correspond to (~, +, x* = -x), ([0, 00[, +, x* = x) and (No, +, n* = n). The purpose of this book is to provide a treatment of these positive definite functions on abelian semigroups with involution. In doing so we also discuss related topics such as negative definite functions, completely mono tone functions and Hoeffding-type inequalities. We view these subjects as important ingredients of harmonic analysis on semigroups. It has been our aim, simultaneously, to write a book which can serve as a textbook for an advanced graduate course, because we feel that the notion of positive definiteness is an important and basic notion which occurs in mathematics as often as the notion of a Hilbert space.
Harmonic Analysis on Semigroups
Title | Harmonic Analysis on Semigroups PDF eBook |
Author | Christian Berg |
Publisher | |
Pages | 289 |
Release | 1984 |
Genre | Analyse harmonique |
ISBN | 9783540909255 |
Harmonic Analysis on Semigroups
Title | Harmonic Analysis on Semigroups PDF eBook |
Author | G. Little (Ph.D.) |
Publisher | |
Pages | 266 |
Release | 1969 |
Genre | Harmonic analysis |
ISBN |
Harmonic Analysis on Semi-Simple Lie Groups II
Title | Harmonic Analysis on Semi-Simple Lie Groups II PDF eBook |
Author | Garth Warner |
Publisher | Springer Science & Business Media |
Pages | 501 |
Release | 2012-12-06 |
Genre | Mathematics |
ISBN | 3642516408 |
Harmonic Analysis on Semi-Simple Lie Groups I
Title | Harmonic Analysis on Semi-Simple Lie Groups I PDF eBook |
Author | Garth Warner |
Publisher | Springer Science & Business Media |
Pages | 545 |
Release | 2012-12-06 |
Genre | Mathematics |
ISBN | 364250275X |
The representation theory of locally compact groups has been vig orously developed in the past twenty-five years or so; of the various branches of this theory, one of the most attractive (and formidable) is the representation theory of semi-simple Lie groups which, to a great extent, is the creation of a single man: Harish-Chandra. The chief objective of the present volume and its immediate successor is to provide a reasonably self-contained introduction to Harish-Chandra's theory. Granting cer tain basic prerequisites (cf. infra), we have made an effort to give full details and complete proofs of the theorems on which the theory rests. The structure of this volume and its successor is as follows. Each book is divided into chapters; each chapter is divided into sections; each section into numbers. We then use the decimal system of reference; for example, 1. 3. 2 refers to the second number in the third section of the first chapter. Theorems, Propositions, Lemmas, and Corollaries are listed consecutively throughout any given number. Numbers which are set in fine print may be omitted at a first reading. There are a variety of Exam ples scattered throughout the text; the reader, if he is so inclined, can view them as exercises ad libitum. The Appendices to the text collect certain ancillary results which will be used on and off in the systematic exposi tion; a reference of the form A2.
Operator Semigroups Meet Complex Analysis, Harmonic Analysis and Mathematical Physics
Title | Operator Semigroups Meet Complex Analysis, Harmonic Analysis and Mathematical Physics PDF eBook |
Author | Wolfgang Arendt |
Publisher | |
Pages | |
Release | 2015 |
Genre | |
ISBN | 9783319184951 |
This proceedings volume originates from a conference held in Herrnhut in June 2013. It provides unique insights into the power of abstract methods and techniques in dealing successfully with numerous applications stemming from classical analysis and mathematical physics. The book features diverse topics in the area of operator semigroups, including partial differential equations, martingale and Hilbert transforms, Banach and von Neumann algebras, Schrödinger operators, maximal regularity and Fourier multipliers, interpolation, operator-theoretical problems (concerning generation, perturbation and dilation, for example), and various qualitative and quantitative Tauberian theorems with a focus on transfinite induction and magics of Cantor. The last fifteen years have seen the dawn of a new era for semigroup theory with the emphasis on applications of abstract results, often unexpected and far removed from traditional ones. The aim of the conference was to bring together prominent experts in the field of modern semigroup theory, harmonic analysis, complex analysis and mathematical physics, and to present the lively interactions between all of those areas and beyond. In addition, the meeting honored the sixtieth anniversary of Prof C. J. K. Batty, whose scientific achievements are an impressive illustration of the conference goal. These proceedings present contributions by prominent scientists at this international conference, which became a landmark event. They will be a valuable and inspiring source of information for graduate students and established researchers.
Topics in Harmonic Analysis, Related to the Littlewood-Paley Theory
Title | Topics in Harmonic Analysis, Related to the Littlewood-Paley Theory PDF eBook |
Author | Elias M. Stein |
Publisher | Princeton University Press |
Pages | 168 |
Release | 1970-02-21 |
Genre | Mathematics |
ISBN | 9780691080673 |
This work deals with an extension of the classical Littlewood-Paley theory in the context of symmetric diffusion semigroups. In this general setting there are applications to a variety of problems, such as those arising in the study of the expansions coming from second order elliptic operators. A review of background material in Lie groups and martingale theory is included to make the monograph more accessible to the student.