AMS Chelsea Publishing 1964; 306 pp; hardcover Volume: 170 Reprint/Revision History: third AMS printing 2003 ISBN10: 0821820222 ISBN13: 9780821820223 List Price: US$43 Member Price: US$38.70 Order Code: CHEL/170.H
 From the Preface (1960): "This book is devoted to an account of one of the branches of functional analysis, the theory of commutative normed rings, and the principal applications of that theory. It is based on [the authors'] paper written ... in 1940, hard on the heels of the initial period of the development of this theory ... "The book consists of three parts. Part one, concerned with the theory of commutative normed rings and divided into two chapters; the first containing foundations of the theory and the second dealing with more special problems. Part two deals with applications to harmonic analysis and is divided into three chapters. The first chapter discusses the ring of absolutely integrable functions on a line with convolution as multiplication and finds the maximal ideals of this ring and some of its analogues. In the next chapter, these results are carried over to arbitrary commutative locally compact groups and they are made the foundation of the construction of harmonic analysis and the theory of characters. A new feature here is the construction of an invariant measure on the group of characters and a proof of the inversion formula for Fourier transforms that is not based on theorems on the representation of positivedefinite functions or positive functionals ... The last chapter of the second partthe most specialized of all the chaptersis devoted to the investigation of the ring of functions of bounded variation on a line with multiplication defined as convolution, including the complete description of the maximal ideals of this ring. The third part of the book is devoted to the discussion of two important classes of rings of functions: regular rings and rings with uniform convergence. The first of the chapters essentially studies the structure of ideals in regular rings. The chapter ends with an example of a ring of functions having closed ideals that cannot be represented as the intersections of maximal ideals. The second chapter discusses the ring \(C(S)\) of all bounded continuous complex functions on completely regular spaces \(S\) and various of its subrings ... "Since noncommutative normed rings with an involution are important for grouptheoretical applications, the paper by I. M. Gelfand and N. A. Naimark, `Normed Rings with an Involution and their Representations', is reproduced at the end of the book, slightly abridged, in the form of an appendix ... This monograph also contains an account of the foundations of the theory of commutative normed rings without, however, touching upon the majority of its analytic applications ... "The reader [should] have knowledge of the elements of the theory of normed spaces and of settheoretical topology. For an understanding of the fourth chapter, [the reader should] also know what a topological group is. It stands to reason that the basic concepts of the theory of measure and of the Lebesgue integral are also assumed to be known ... " Readership Graduate students and research mathematicians. Table of Contents Part One  The General Theory of Commutative Normed Rings: 1.1 The concept of a normed ring; 1.2 Maximal ideals; 1.3 Abstract analytic functions; 1.4 Functions on maximal ideals. The radical of a ring; 1.5 The space of maximal ideals; 1.6 Analytic functions of an element of a ring; 1.7 The ring \(\hat{R}\) of functions \(x(M)\); 1.8 Rings with an involution
 The General Theory of Commutative Normed Rings (cont'd): 2.9 The connection between algebraic and topological isomorphisms; 2.10 Generalized divisors of zero; 2.11 The boundary of the space of maximal ideals; 2.12 Extension of maximal ideals; 2.13 Locally analytic operations on certain elements of a ring; 2.14 Decomposition of a normed ring into a direct sum of ideals; 2.15 The normed space adjoint to a normed ring
Part Two  The Ring of Absolutely Integrable Functions and Their Discrete Analogues: 3.16 The ring \(V\) of absolutely integrable functions on the line; 3.17 Maximal ideals of the rings \(V\) and \(V_+\); 3.18 The ring of absolutely integrable functions with a weight; 3.19 Discrete analogues to the rings of absolutely integrable functions
 Harmonic Analysis on Commutative Locally Compact Groups: 4.20 The group ring of a commutative locally compact group; 4.21 Maximal ideals of the group ring and the characters of a group; 4.22 The uniqueness theorem for the Fourier transform and the abundance of the set of characters; 4.23 The group of characters; 4.24 The invariant integral on the group of characters; 4.25 Inversion formulas for the Fourier transform; 4.26 The Pontrjagin duality law; 4.27 Positivedefinite functions
 The Ring of Functions of Bounded Variation on a Line: 5.28 Functions of bounded variation on a line; 5.29 The ring of jump functions; 5.30 Absolutely continuous and discrete maximal ideals of the ring \(V^{(b)}\); 5.31 Singular maximal ideals of the ring \(V^{(b)}\); 5.32 Perfect sets with linearly independent points. The asymmetry of the ring \(V^{(b)}\); 5.33 The general form of maximal ideals of the ring \(V^{(b)}\)
Part Three  Regular Rings: 6.34 Definitions, examples, and simplest properties; 6.35 The local theorem; 6.36 Minimal ideals; 6.37 Primary ideals; 6.38 Locally isomorphic rings; 6.39 Connection between the residueclass rings of two rings of functions, one embedded in the other; 6.40 Wiener's Tauberian theorem; 6.41 Primary ideals in homogeneous rings of functions; 6.42 Remarks on arbitrary closed ideals. An example of L. Schwartz
 Rings with Uniform Convergence: 7.43 Symmetric subrings of \(C(S)\) and compact extensions of a space \(S\); 7.44 The problem of arbitrary closed subrings of the ring \(C(S)\); 7.45 Ideals in rings with uniform convergence
 Normed Rings with an Involution and Their Representations: 8.46 Rings with an involution and their representations; 8.47 Positive functionals and their connection with representations of rings; 8.48 Embedding of a ring with an involution in a ring of operators; 8.49 Indecomposable functionals and irreducible representations; 8.50 The case of commutative rings; 8.51 Group rings; 8.52 Example of an unsymmetric group ring
 The Decomposition of a Commutative Normed Ring into a Direct Sum of Ideals: 9.53 Introduction; 9.54 Characterization of the space of maximal ideals of a commutative normed ring; 9.55 A problem on analytic functions in a finitely generated ring; 9.56 Construction of a special finitely generated subring; 9.57 Proof of the theorem on the decomposition of a ring into a direct sum of ideals; 9.58 Some corollaries
 HistoricoBibliographical Notes
 Bibliography
 Index
