In the past fifteen years, the theory of right-angled Artin groups and special cube complexes has emerged as a central topic in geometric group theory. This monograph provides an account of this theory, along with other modern techniques in geometric group theory. Structured around the theme of group actions on contractible polyhedra, this book explores two prominent methods for constructing such actions: utilizing the group of deck transformations of the universal cover of a nonpositively curved polyhedron and leveraging the theory of simple complexes of groups. The book presents various approaches to obtaining cubical examples through CAT(0) cube complexes, including the polyhedral product construction, hyperbolization procedures, and the Sageev construction. Moreover, it offers a unified presentation of important non-cubical examples, such as Coxeter groups, Artin groups, and groups that act on buildings. Designed as a resource for graduate students and researchers specializing in geometric group theory, this book should also be of high interest to mathematicians in related areas, such as 3-manifolds.

The series is aimed specifically at publishing peer reviewed reviews and contributions presented at workshops and conferences. Each volume is associated with a particular conference, symposium or workshop. These events cover various topics within pure and applied mathematics and provide up-to-date coverage of new developments, methods and applications.

This volume focuses on group theory and model theory with a particular emphasis on the interplay of the two areas. The survey papers provide an overview of the developments across group, module, and model theory while the research papers present the most recent study in those same areas. With introductory sections that make the topics easily accessible to students, the papers in this volume will appeal to beginning graduate students and experienced researchers alike. As a whole, this book offers a cross-section view of the areas in group, module, and model theory, covering topics such as DP-minimal groups, Abelian groups, countable 1-transitive trees, and module approximations. The papers in this book are the proceedings of the conference “New Pathways between Group Theory and Model Theory,” which took place February 1-4, 2016, in Mülheim an der Ruhr, Germany, in honor of the editors’ colleague Rüdiger Göbel. This publication is dedicated to Professor Göbel, who passed away in 2014. He was one of the leading experts in Abelian group theory.

An introduction to the modern representation theory of big groups, exploring its connections to probability and algebraic combinatorics.

A landmark in jazz studies, Thinking in Jazz reveals as never before how musicians, both individually and collectively, learn to improvise. Chronicling leading musicians from their first encounters with jazz to the development of a unique improvisatory voice, Paul Berliner documents the lifetime of preparation that lies behind the skilled improviser's every idea. The product of more than fifteen years of immersion in the jazz world, Thinking in Jazz combines participant observation with detailed musicological analysis, the author's experience as a jazz trumpeter, interpretations of published material by scholars and performers, and, above all, original data from interviews with more than fifty professional musicians: bassists George Duvivier and Rufus Reid; drummers Max Roach, Ronald Shannon Jackson, and Akira Tana; guitarist Emily Remler; pianists Tommy Flanagan and Barry Harris; saxophonists Lou Donaldson, Lee Konitz, and James Moody; trombonist Curtis Fuller; trumpeters Doc Cheatham, Art Farmer, Wynton Marsalis, and Red Rodney; vocalists Carmen Lundy and Vea Williams; and others. Together, the interviews provide insight into the production of jazz by great artists like Betty Carter, Miles Davis, Dizzy Gillespie, Coleman Hawkins, and Charlie Parker. Thinking in Jazz overflows with musical examples from the 1920s to the present, including original transcriptions (keyed to commercial recordings) of collective improvisations by Miles Davis's and John Coltrane's groups. These transcriptions provide additional insight into the structure and creativity of jazz improvisation and represent a remarkable resource for jazz musicians as well as students and educators. Berliner explores the alternative ways—aural, visual, kinetic, verbal, emotional, theoretical, associative—in which these performers conceptualize their music and describes the delicate interplay of soloist and ensemble in collective improvisation. Berliner's skillful integration of data concerning musical development, the rigorous practice and thought artists devote to jazz outside of performance, and the complexities of composing in the moment leads to a new understanding of jazz improvisation as a language, an aesthetic, and a tradition. This unprecedented journey to the heart of the jazz tradition will fascinate and enlighten musicians, musicologists, and jazz fans alike.

A pro-p group is the inverse limit of some system of finite p-groups, that is, of groups of prime-power order where the prime - conventionally denoted p - is fixed. Thus from one point of view, to study a pro-p group is the same as studying an infinite family of finite groups; but a pro-p group is also a compact topological group, and the compactness works its usual magic to bring 'infinite' problems down to manageable proportions. The p-adic integers appeared about a century ago, but the systematic study of pro-p groups in general is a fairly recent development. Although much has been dis covered, many avenues remain to be explored; the purpose of this book is to present a coherent account of the considerable achievements of the last several years, and to point the way forward. Thus our aim is both to stimulate research and to provide the comprehensive background on which that research must be based. The chapters cover a wide range. In order to ensure the most authoritative account, we have arranged for each chapter to be written by a leading contributor (or contributors) to the topic in question. Pro-p groups appear in several different, though sometimes overlapping, contexts.

A co-publication of the AMS and Bar-Ilan University This volume contains the proceedings of the Research Workshop of the Israel Science Foundation on Groups, Algebras and Identities, held from March 20–24, 2016, at Bar-Ilan University and The Hebrew University of Jerusalem, Israel, in honor of Boris Plotkin's 90th birthday. The papers in this volume cover various topics of universal algebra, universal algebraic geometry, logic geometry, and algebraic logic, as well as applications of universal algebra to computer science, geometric ring theory, small cancellation theory, and Boolean algebras.

In algebraic topology some classical invariants - such as Betti numbers and Reidemeister torsion - are defined for compact spaces and finite group actions. They can be generalized using von Neumann algebras and their traces, and applied also to non-compact spaces and infinite groups. These new L2-invariants contain very interesting and novel information and can be applied to problems arising in topology, K-Theory, differential geometry, non-commutative geometry and spectral theory. The book, written in an accessible manner, presents a comprehensive introduction to this area of research, as well as its most recent results and developments.

Written by one of the subject’s foremost experts, this book focuses on the central developments and modern methods of the advanced theory of abelian groups, while remaining accessible, as an introduction and reference, to the non-specialist. It provides a coherent source for results scattered throughout the research literature with lots of new proofs. The presentation highlights major trends that have radically changed the modern character of the subject, in particular, the use of homological methods in the structure theory of various classes of abelian groups, and the use of advanced set-theoretical methods in the study of un decidability problems. The treatment of the latter trend includes Shelah’s seminal work on the un decidability in ZFC of Whitehead’s Problem; while the treatment of the former trend includes an extensive (but non-exhaustive) study of p-groups, torsion-free groups, mixed groups and important classes of groups arising from ring theory. To prepare the reader to tackle these topics, the book reviews the fundamentals of abelian group theory and provides some background material from category theory, set theory, topology and homological algebra. An abundance of exercises are included to test the reader’s comprehension, and to explore noteworthy extensions and related sidelines of the main topics. A list of open problems and questions, in each chapter, invite the reader to take an active part in the subject’s further development.