Covers group theory and its applications, and the theory of algebraic numbers. This book covers advanced topics, such as algebraic functions, elliptic functions and class field theory.

This Chelsea publication is now available in English for the general mathematical audience, 50 years after the original Russian edition was published. The book lays the foundation of what later became Krein's Theory of String. The original ideas stemming from mechanical considerations are developed with clarity and the book can be read profitably by both research mathematicians and engineers.

Emphasizes the conceptual and historical continuity of analytic function theory. This work covers topics including elliptic functions, entire and meromorphic functions, as well as conformal mapping. It features chapters on majorization and on functions holomorphic in a half-plane.

A guide to Line Complex.

By 'combinatory analysis', the author understands the part of combinatorics now known as 'algebraic combinatorics'. He presents the classical results of the outstanding 19th century school of British mathematicians.

Presents a translation of the last of Caratheodory's celebrated text books, Funktiontheorie, Volume 1.

Presents an introduction to probability and statistics. This book covers topics that include the axiomatic setup of probability theory, polynomial distribution, finite Markov chains, distribution functions and convolution, the laws of large numbers (weak a

Presents a detailed study of a class of solvable models in quantum mechanics that describe the motion of a particle in a potential having support at the positions of a discrete (finite or infinite) set of point sources. This title is suitable for graduate

Presents an account of the theory of algebraic numbers and ideals leading up to Dedekind's theorem that every ideal of an algebraic number field is the unique product of prime ideals. This work studies Landau's generalization of the prime number theorem that was conjectured by Gauss and proven by Hadamard and Vallee Poussin in 1896.

Suitable for an undergraduate first course in ring theory, this work discusses the various aspects of commutative and noncommutative ring theory. It begins with basic module theory and then proceeds to surveying various special classes of rings (Wedderbum, Artinian and Noetherian rings, hereditary rings and Dedekind domains.).