The second volume of the Geometry of Algebraic Curves is devoted to the foundations of the theory of moduli of algebraic curves. Its authors are research mathematicians who have actively participated in the development of the Geometry of Algebraic Curves. The subject is an extremely fertile and active one, both within the mathematical community and at the interface with the theoretical physics community. The approach is unique in its blending of algebro-geometric, complex analytic and topological/combinatorial methods. It treats important topics such as Teichm ller theory, the cellular decomposition of moduli and its consequences and the Witten conjecture. The careful and comprehensive presentation of the material is of value to students who wish to learn the subject and to experts as a reference source.

The first volume appeared 1985 as vol. 267 of the same series.

In recent years there has been enormous activity in the theory of algebraic curves. Many long-standing problems have been solved using the general techniques developed in algebraic geometry during the 1950's and 1960's. Additionally, unexpected and deep connections between algebraic curves and differential equations have been uncovered, and these in turn shed light on other classical problems in curve theory. It seems fair to say that the theory of algebraic curves looks completely different now from how it appeared 15 years ago; in particular, our current state of knowledge repre sents a significant advance beyond the legacy left by the classical geometers such as Noether, Castelnuovo, Enriques, and Severi. These books give a presentation of one of the central areas of this recent activity; namely, the study of linear series on both a fixed curve (Volume I) and on a variable curve (Volume II). Our goal is to give a comprehensive and self-contained account of the extrinsic geometry of algebraic curves, which in our opinion constitutes the main geometric core of the recent advances in curve theory. Along the way we shall, of course, discuss appli cations of the theory of linear series to a number of classical topics (e.g., the geometry of the Riemann theta divisor) as well as to some of the current research (e.g., the Kodaira dimension of the moduli space of curves)."

Ethical questions are often associated with practical dilemmas: questions in morality, in other words. This volume, by contrast, asks questions about morality: what it is, and to what it owes its precarious authority over us. The focus on metaethics is sustained throughout, via a wide range of philosophical perspectives. Distinguished luminaries who include R. M. Hare and Bernard Williams address keenly debated issues such as what constitutes morality in politics; the relationship between education and ethical standards; and whether or not morality can indeed be defined at all. As Nikhil Krishnan writes in his elegant Foreword, 'The plain-speaking, essayistic grace of these essays, speaks nevertheless of the possibility of moral philosophy, written with an eye to a listener, very possibly not a professional philosopher, who has the right to say, ''This is all very well, your neat little theory, but it doesn't ring true. Things are more complicated than that.'''

The second volume of the Geometry of Algebraic Curves is devoted to the foundations of the theory of moduli of algebraic curves. Its authors are research mathematicians who have actively participated in the development of the Geometry of Algebraic Curves. The subject is an extremely fertile and active one, both within the mathematical community and at the interface with the theoretical physics community. The approach is unique in its blending of algebro-geometric, complex analytic and topological/combinatorial methods. It treats important topics such as Teichmuller theory, the cellular decomposition of moduli and its consequences and the Witten conjecture. The careful and comprehensive presentation of the material is of value to students who wish to learn the subject and to experts as a reference source. The first volume appeared 1985 as vol. 267 of the same series.

This completely revised and corrected version of the well-known Florence notes circulated by the authors together with E. Friedlander examines basic topology, emphasizing homotopy theory. Included is a discussion of Postnikov towers and rational homotopy theory. This is then followed by an in-depth look at differential forms and de Tham's theorem on simplicial complexes. In addition, Sullivan's results on computing the rational homotopy type from forms is presented. New to the Second Edition: *Fully-revised appendices including an expanded discussion of the Hirsch lemma *Presentation of a natural proof of a Serre spectral sequence result *Updated content throughout the book, reflecting advances in the area of homotopy theory With its modern approach and timely revisions, this second edition of Rational Homotopy Theory and Differential Forms will be a valuable resource for graduate students and researchers in algebraic topology, differential forms, and homotopy theory.

In recent years there has been enormous activity in the theory of algebraic curves. Many long-standing problems have been solved using the general techniques developed in algebraic geometry during the 1950's and 1960's. Additionally, unexpected and deep connections between algebraic curves and differential equations have been uncovered, and these in turn shed light on other classical problems in curve theory. It seems fair to say that the theory of algebraic curves looks completely different now from how it appeared 15 years ago; in particular, our current state of knowledge repre sents a significant advance beyond the legacy left by the classical geometers such as Noether, Castelnuovo, Enriques, and Severi. These books give a presentation of one of the central areas of this recent activity; namely, the study of linear series on both a fixed curve (Volume I) and on a variable curve (Volume II). Our goal is to give a comprehensive and self-contained account of the extrinsic geometry of algebraic curves, which in our opinion constitutes the main geometric core of the recent advances in curve theory. Along the way we shall, of course, discuss appli cations of the theory of linear series to a number of classical topics (e.g., the geometry of the Riemann theta divisor) as well as to some of the current research (e.g., the Kodaira dimension of the moduli space of curves)."

Philosophy of mind as traditionally understood has rarely engaged directly with psychology and psychiatry. This collection establishes the importance of this interdisciplinary approach and explores new directions in the "philosophy of psychiatry and psychology." The essays are by a distinguished group of contributors whose interests and expertise embrace the cognitive, biological and medical sciences as well as the social sciences and humanities. They address questions such as what establishes personality or personal identity? how should insanity, or sanity, be defined? and what is "consent?"

This volume offers a lively and accessible guide to some of the major issues current in French philosophy today and to some of the figures who are or have been influential in shaping its development. The collection is unusual and interesting in bringing together a range of contributors from both Britain and France, and is intended not only for professional philosophers but also for those with a more general interest in the French intellectual scene.

The aim of this book, which was originally published in 1985, is to cover from first principles the theory of Syzygies, building up from a discussion of the basic commutative algebra to such results as the authors' proof of the Syzygy Theorem. In the last three chapters applications of the theory to commutative algebra and algebraic geometry are given.

This book was first published in 1985. The journal is concerned with the study of philosophy in all its branches: logic, metaphysics, epistemology, ethics, aesthetics, social and political philosophy and the philosophies of religion, science, history, language, mind and education. The journal is not committed to any particular school or method and contributors are expected to avoid needless technicality. There is a section on new books which includes reviews, book notes and a list of books received.

This completely revised and corrected version of the well-known Florence notes circulated by the authors together with E. Friedlander examines basic topology, emphasizing homotopy theory. Included is a discussion of Postnikov towers and rational homotopy theory. This is then followed by an in-depth look at differential forms and de Tham's theorem on simplicial complexes. In addition, Sullivan's results on computing the rational homotopy type from forms is presented. New to the Second Edition: *Fully-revised appendices including an expanded discussion of the Hirsch lemma *Presentation of a natural proof of a Serre spectral sequence result *Updated content throughout the book, reflecting advances in the area of homotopy theory With its modern approach and timely revisions, this second edition of Rational Homotopy Theory and Differential Forms will be a valuable resource for graduate students and researchers in algebraic topology, differential forms, and homotopy theory.

This is a reproduction of a book published before 1923. This book may have occasional imperfections such as missing or blurred pages, poor pictures, errant marks, etc. that were either part of the original artifact, or were introduced by the scanning process. We believe this work is culturally important, and despite the imperfections, have elected to bring it back into print as part of our continuing commitment to the preservation of printed works worldwide. We appreciate your understanding of the imperfections in the preservation process, and hope you enjoy this valuable book.

What impulses lead us to ask philosophical questions and pursue philosophical enquiry? In a series of stimulating essays fourteen distinguished thinkers examine philosophy and their own engagement with it. Titles such as "How philosophers (who lose their faith) redefine their subject," "Philosophical plumbing," "Putting into order what we already know" and "Is philosophy a 'theory of everything'?" indicate the range of topics and the lively and provocative ways in which they are tackled.

In her work, Nazgol Ansarinia examines the systems and networks that underpin her daily life, such as everyday objects, routines, events, and experiences, and the relationship they form to a larger social context. This new monograph surveys the artist's work of the last fifteen years in sculptures, installation, drawing, and video. The individual projects represent ways of understanding the role of architecture in delineating interior end exterior spaces and private and public spheres. Ansarinia's works are largely observational and technical in their scope, offering insight into the issues that are most pressing and urgent for today's cities and the populations that inhabit them. This fully illustrated publication features in-depth essays by Media Farzin, Hamed Khosravi, and Maria Lind.