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The basis for KILLING EVE, now a major BBC TV series, starring Sandra Oh, written by Phoebe Waller-Bridge 'Gloriously exciting' Metro She is the perfect assassin. A Russian orphan, saved from the death penalty for the brutal revenge she took on her gangster father's killers. Ruthlessly trained. Given a new life. New names, new faces - whichever fits. Her paymasters call themselves The Twelve. But she knows nothing of them. Konstantin is the man who saved her, and the one she answers to. She is Villanelle. Without conscience. Without guilt. Without weakness. Eve Polastri is the woman who hunts her. MI5, until one error of judgment costs her everything. Then stopping a ruthless assassin becomes more than her job. It becomes personal. Originally published as ebook singles: Codename Villanelle, Hollowpoint, Shanghai and Odessa. Villanelle: No Tomorrow is available for pre-order now! Praise for Killing Eve TV series 'A dazzling thriller . . . mightily entertaining' Guardian 'Entertaining, clever and darkly comic' New York Times
Create your own robots, toys, remote controllers, alarms, detectors, and more with the Arduino device. This simple microcontroller has become popular for building a variety of objects that interact with the physical world. These recipes provide solutions for the most common problems and questions Arduino users have.
For library science students and professionals, Introduction to Serials Work for Library Technicians is a practical, how-to-do-it textbook that shows you how to perform the behind-the-scenes tasks your job requires. This primer walks you through the entire process of serials management for both larger libraries with automated serials management systems as well as small school and public libraries that must handle their serials manually. The complete glossary, bibliography, numerous definitions, and tables, as well as the real-life examples throughout this manual will help you navigate the challenges of record-keeping, claiming, and cataloguing serials in any library.
This book surveys more than 125 years of aspects of associative algebras, especially ring and module theory. It is the first to probe so extensively such a wealth of historical development. Moreover, the author brings the reader up to date, in particular through his report on the subject in the second half of the twentieth century. Included in the book are certain categorical properties from theorems of Frobenius and Stickelberger on the primary decomposition of finite Abelian formulations of the latter by Krull, Goldman, and others; Maschke's theorem on the representation theory of finite groups over a field; and the fundamental theorems of Wedderburn on the structure of finite dimensional algebras Goldie, and others. A special feature of the book is the in-depth study of rings with chain condition on annihilator ideals pioneered by Noether, Artin, and Jacobson and refined and extended by many later mathematicians. Two of the author's prior works, Algebra: Rings, Modules and Categories, I and II (Springer-Verlag, 1973), are devoted to the development of modern associative algebra and ring and module theory. Those bibliography of over 1,600 references and is exhaustively indexed. In addition to the mathematical survey, the author gives candid and descriptive impressions of the last half of the twentieth century in ''Part II: Snapshots of fellow graduate students at the University of Kentucky and at Purdue, Faith discusses his Fulbright-Nato Postdoctoral at Heidelberg and at the Institute for Advanced Study (IAS) at Princeton, his year as a visiting scholar at Berkeley, and the many acquaintances he met there and in subsequent travels in India, Europe, and most recently, Barcelona. Comments on the first edition: ''Researchers in algebra should find it both full references as to the origin and development of the theorem ... I know of no other work in print which does this as thoroughly and as broadly.'' --John O'Neill, University of Detroit at Mercy '' 'Part II: Snapshots of Mathematicians of my age and younger will relish reading 'Snapshots'.'' --James A. Huckaba, University of Missouri-Columbia
This volume provides a comprehensive introduction to module theory and the related part of ring theory, including original results as well as the most recent work. It is a useful and stimulating study for those new to the subject as well as for researchers and serves as a reference volume. Starting form a basic understanding of linear algebra, the theory is presented and accompanied by complete proofs. For a module M, the smallest Grothendieck category containing it is denoted by o[M] and module theory is developed in this category. Developing the techniques in o[M] is no more complicated than in full module categories and the higher generality yields significant advantages: for example, module theory may be developed for rings without units and also for non-associative rings. Numerous exercises are included in this volume to give further insight into the topics covered and to draw attention to related results in the literature.