The perfect Father's Day gift for cheeky dads! A very funny short Dino story in board book format with just 12 pages, this book is a wonderful introduction to the series for very young children. Count
Theophrastus' Characters is a collection of 30 short character-sketches of various types of individuals who might be met in the streets of Athens in the late fourth century BC. It is a work which had a profound influence on European literature, and this is a detailed and elaborate treatment of it. This edition presents an improved text, a translation which is designed both to be readable and to bring out fully the nuances of the very difficult Greek, and a commentary which covers every feature of the text and its interpretation and offers particularly full elucidation of the often enigmatic references to contemporary social practices and historical events. There is also a lengthy introduction, which discusses the antecedents and affiliations of the work, its date, its purpose, and the manuscript tradition. Extensive indexes are also provided, including an Index Verborum.
Theophrastus' Characters is a collection of 30 short character-sketches of various types of individuals who might be met in the streets of Athens in the late fourth century BC. It is a work which had a profound influence on European literature, and this is a detailed and elaborate treatment of it. This edition presents an improved text, a translation which is designed both to be readable and to bring out fully the nuances of the very difficult Greek, and a commentary which covers every feature of the text and its interpretation and offers particularly full elucidation of the often enigmatic references to contemporary social practices and historical events. There is also a lengthy introduction, which discusses the antecedents and affiliations of the work, its date, its purpose, and the manuscript tradition. Extensive indexes are also provided, including an Index Verborum.
Can you taste words, feel flavours as a shape, or hear colors? If so you may well have synaesthesia, a neurological condition that gives rise to a 'merging of the senses'.This Very Short Introduction
Helen Graham, author of The Spanish Civil War: A Very Short Introduction, here brings together leading historians of international renown to examine 20th-century Spain in light of Franco's dictatorshi
The Levellers were a crucial component of a radically democratic movement during the civil wars in seventeenth-century England. This was to be democratic at a time when the very idea of democracy conjured up nothing good; with its suggestion of anarchy and the 'levelling' of distinctions in rank and of property, even the holding of women in common. This collection of thirteen fully annotated Leveller writings, including their famous Agreements of the People, is important as a contribution not only to the understanding of the English civil wars, but also of democratic theory. The editor's introduction sets the Leveller ideas in their context and, together with a chronology, short biographies of the leading figures and a guide to further reading, will be of interest to students of the English civil wars, the history of political thought and the history of democratic ideas.
This 2000 book provides a self-contained introduction to typical properties of homeomorphisms. Examples of properties of homeomorphisms considered include transitivity, chaos and ergodicity. A key idea here is the interrelation between typical properties of volume preserving homeomorphisms and typical properties of volume preserving bijections of the underlying measure space. The authors make the first part of this book very concrete by considering volume preserving homeomorphisms of the unit n-dimensional cube, and they go on to prove fixed point theorems (Conley–Zehnder– Franks). This is done in a number of short self-contained chapters which would be suitable for an undergraduate analysis seminar or a graduate lecture course. Much of this work describes the work of the two authors, over the last twenty years, in extending to different settings and properties, the celebrated result of Oxtoby and Ulam that for volume homeomorphisms of the unit cube, ergodicity is a typical property.
The Levellers were a crucial component of a radically democratic movement during the civil wars in seventeenth-century England. This was to be democratic at a time when the very idea of democracy conjured up nothing good; with its suggestion of anarchy and the 'levelling' of distinctions in rank and of property, even the holding of women in common. This collection of thirteen fully annotated Leveller writings, including their famous Agreements of the People, is important as a contribution not only to the understanding of the English civil wars, but also of democratic theory. The editor's introduction sets the Leveller ideas in their context and, together with a chronology, short biographies of the leading figures and a guide to further reading, will be of interest to students of the English civil wars, the history of political thought and the history of democratic ideas.
This 2000 book provides a self-contained introduction to typical properties of homeomorphisms. Examples of properties of homeomorphisms considered include transitivity, chaos and ergodicity. A key idea here is the interrelation between typical properties of volume preserving homeomorphisms and typical properties of volume preserving bijections of the underlying measure space. The authors make the first part of this book very concrete by considering volume preserving homeomorphisms of the unit n-dimensional cube, and they go on to prove fixed point theorems (Conley–Zehnder– Franks). This is done in a number of short self-contained chapters which would be suitable for an undergraduate analysis seminar or a graduate lecture course. Much of this work describes the work of the two authors, over the last twenty years, in extending to different settings and properties, the celebrated result of Oxtoby and Ulam that for volume homeomorphisms of the unit cube, ergodicity is a typical property.
Rudyard Kipling (1865–1936) is among the most popular, acclaimed and controversial of writers in English. His books have sold in great numbers, and he remains the youngest writer to have won the Nobel Prize in Literature. Many associate Kipling with poems such as 'If–', his novel Kim, his pioneering use of the short story form and such works for children as the Just So Stories. For others, though, Kipling is the very symbol of the British Empire and a belligerent approach to other peoples and races. This Companion explores Kipling's main themes and texts, the different genres in which he worked and the various phases of his career. It also examines the 'afterlives' of his texts in postcolonial writing and through adaptations of his work. With a chronology and guide to further reading, this book serves as a useful introduction for students of literature and of Empire and its after effects.
Rudyard Kipling (1865–1936) is among the most popular, acclaimed and controversial of writers in English. His books have sold in great numbers, and he remains the youngest writer to have won the Nobel Prize in Literature. Many associate Kipling with poems such as 'If–', his novel Kim, his pioneering use of the short story form and such works for children as the Just So Stories. For others, though, Kipling is the very symbol of the British Empire and a belligerent approach to other peoples and races. This Companion explores Kipling's main themes and texts, the different genres in which he worked and the various phases of his career. It also examines the 'afterlives' of his texts in postcolonial writing and through adaptations of his work. With a chronology and guide to further reading, this book serves as a useful introduction for students of literature and of Empire and its after effects.
This lively and accessible introduction to the social, moral, and cultural foundations of law takes a broad scope - spanning philosophy, law, politics, and economics, and discussing a range of topics
In this book, three authors introduce readers to strong approximation methods, analytic pro-p groups and zeta functions of groups. Each chapter illustrates connections between infinite group theory, number theory and Lie theory. The first introduces the theory of compact p-adic Lie groups. The second explains how methods from linear algebraic groups can be utilised to study the finite images of linear groups. The final chapter provides an overview of zeta functions associated to groups and rings. Derived from an LMS/EPSRC Short Course for graduate students, this book provides a concise introduction to a very active research area and assumes less prior knowledge than existing monographs or original research articles. Accessible to beginning graduate students in group theory, it will also appeal to researchers interested in infinite group theory and its interface with Lie theory and number theory.
All people desire to know. We want to not only know what has happened, but also why it happened, how it happened, whether it will happen again, whether it can be made to happen or not happen, and so on. In short, what we want are explanations. Asking and answering explanatory questions lies at the very heart of scientific practice. The primary aim of this book is to help readers understand how science explains the world. This book explores the nature and contours of scientific explanation, how such explanations are evaluated, as well as how they lead to knowledge and understanding. As well as providing an introduction to scientific explanation, it also tackles misconceptions and misunderstandings, while remaining accessible to a general audience with little or no prior philosophical training.
In Marx: A Very Short Introduction, Peter Singer identifies the central vision that unifies Marx's thought, enabling us to grasp Marx's views as a whole. He sees him as a philosopher primarily concern
In this book, three authors introduce readers to strong approximation methods, analytic pro-p groups and zeta functions of groups. Each chapter illustrates connections between infinite group theory, number theory and Lie theory. The first introduces the theory of compact p-adic Lie groups. The second explains how methods from linear algebraic groups can be utilised to study the finite images of linear groups. The final chapter provides an overview of zeta functions associated to groups and rings. Derived from an LMS/EPSRC Short Course for graduate students, this book provides a concise introduction to a very active research area and assumes less prior knowledge than existing monographs or original research articles. Accessible to beginning graduate students in group theory, it will also appeal to researchers interested in infinite group theory and its interface with Lie theory and number theory.