Society, in its quest for order in an inherently chaotic natural setting, tends to think about technological innovation much too narrowly. Innovation is necessary for economic growth, yet this narrow attitude limits its possibilities and focuses on achieving a single goal without acknowledging its effect on other aspects of society. By thinking out of the box, this book encourages thoughtful innovation while remaining conscious of its positive and negative consequences for society. It presents a method for contextual analysis that enables assessment of the disruption that any innovation could induce, and puts ideas into contexts so that innovators may anticipate consequences, minimize resistance, and enhance acceptance. Drawing on Anglophone and Francophone literatures in business, economics, history, and sociology, this book reminds us that progress is often achieved at some sacrifice of well-being. It allows academics and practitioners from these traditions to engage in systematic communication and enrich one another with new ideas.
Growing Food God's Way is a compelling biography of veteran gardener Paul Gautschi. Known world-wide for his connection with God's world of nature, this authorized work explores the man and his wildly successful garden and orchard...while applying revealed principles to our daily lives as well. Home gardeners in 208 countries agree that you can grow better produce with much less cost and less work if you do it God's way.CAUTION: this book may rock your worldview!
A vital guide to achieving success in the business-to-business E-marketplace addresses a wealth of issues, from consulting, audit, and security to taxation and financing, and covers such information as which NetMarket business models work most effectively in particular industries, the seven key B2B trends every business must consider, and much more.
Society, in its quest for order in an inherently chaotic natural setting, tends to think about technological innovation much too narrowly. Innovation is necessary for economic growth, yet this narrow attitude limits its possibilities and focuses on achieving a single goal without acknowledging its effect on other aspects of society. By thinking out of the box, this book encourages thoughtful innovation while remaining conscious of its positive and negative consequences for society. It presents a method for contextual analysis that enables assessment of the disruption that any innovation could induce, and puts ideas into contexts so that innovators may anticipate consequences, minimize resistance, and enhance acceptance. Drawing on Anglophone and Francophone literatures in business, economics, history, and sociology, this book reminds us that progress is often achieved at some sacrifice of well-being. It allows academics and practitioners from these traditions to engage in systematic communication and enrich one another with new ideas.
Society, in its quest for order in an inherently chaotic natural setting, tends to think about technological innovation much too narrowly. Innovation is necessary for economic growth, yet this narrow attitude limits its possibilities and focuses on achieving a single goal without acknowledging its effect on other aspects of society. By thinking out of the box, this book encourages thoughtful innovation while remaining conscious of its positive and negative consequences for society. It presents a method for contextual analysis that enables assessment of the disruption that any innovation could induce, and puts ideas into contexts so that innovators may anticipate consequences, minimize resistance, and enhance acceptance. Drawing on Anglophone and Francophone literatures in business, economics, history, and sociology, this book reminds us that progress is often achieved at some sacrifice of well-being. It allows academics and practitioners from these traditions to engage in systematic communication and enrich one another with new ideas.
This book introduces students with diverse backgrounds to various types of mathematical analysis that are commonly needed in scientific computing. The subject of numerical analysis is treated from a mathematical point of view, offering a complete analysis of methods for scientific computing with appropriate motivations and careful proofs. In an engaging and informal style, the authors demonstrate that many computational procedures and intriguing questions of computer science arise from theorems and proofs. Algorithms are presented in pseudocode, so that students can immediately write computer programs in standard languages or use interactive mathematical software packages. This book occasionally touches upon more advanced topics that are not usually contained in standard textbooks at this level.
Although Hofmannsthal never completed his only novel Andreas, its theme—the quest for self through memory—haunted the Viennese writer and recurs again and again in his poems, libretti, and essays. Analyzing the fragment, David Miles discusses Hofmannsthal's understanding of memory and myth, Andreas' pivotal role in his work, and its place within the tradition of such novels as Goethe's Wilhelm Meister and Rilke's Malte. Originally published in 1972. The Princeton Legacy Library uses the latest print-on-demand technology to again make available previously out-of-print books from the distinguished backlist of Princeton University Press. These editions preserve the original texts of these important books while presenting them in durable paperback and hardcover editions. The goal of the Princeton Legacy Library is to vastly increase access to the rich scholarly heritage found in the thousands of books published by Princeton University Press since its founding in 1905.
This volume marks the 20th anniversary of the New York Number Theory Seminar (NYNTS). Beginning in 1982, the NYNTS has tried to present a broad spectrum of research in number theory and related fields of mathematics, from physics to geometry to combinatorics and computer science. The list of seminar speakers includes not only Fields Medallists and other established researchers, but also many other younger and less well known mathematicians whose theorems are significant and whose work may become the next big thing in number theory.
The foundation for the subject of mathematical finance was laid nearly 100 years ago by Bachelier in his fundamental work, Theorie de la speculation. In this work, he provided the first treatment of Brownian motion. Since then, the research of Markowitz, and then of Black, Merton, Scholes, and Samuelson brought remarkable and important strides in the field. A few years later, Harrison and Kreps demonstrated the fundamental role of martingales and stochastic analysis in constructing and understanding models for financial markets. The connection opened the door for a flood of mathematical developments and growth. Concurrently with these mathematical advances, markets have grown, and developments in both academia and industry continue to expand. This lively activity inspired an AMS Short Course at the Joint Mathematics Meetings in San Diego (CA). The present volume includes the written results of that course. Articles are featured by an impressive list of recognized researchers and practitioners. Their contributions present deep results, pose challenging questions, and suggest directions for future research. This collection offers compelling introductory articles on this new, exciting, and rapidly growing field.
Spectral Methods Using Multivariate Polynomials on the Unit Ball is a research level text on a numerical method for the solution of partial differential equations. The authors introduce, illustrate with examples, and analyze 'spectral methods' that are based on multivariate polynomial approximations. The method presented is an alternative to finite element and difference methods for regions that are diffeomorphic to the unit disk, in two dimensions, and the unit ball, in three dimensions. The speed of convergence of spectral methods is usually much higher than that of finite element or finite difference methods. Features Introduces the use of multivariate polynomials for the construction and analysis of spectral methods for linear and nonlinear boundary value problems Suitable for researchers and students in numerical analysis of PDEs, along with anyone interested in applying this method to a particular physical problem One of the few texts to address this area using multivariate orthogonal polynomials, rather than tensor products of univariate polynomials.
The first in-depth, complete, and unified theoretical discussion of the two most important classes of algorithms for solving matrix eigenvalue problems: QR-like algorithms for dense problems and Krylov subspace methods for sparse problems. The author discusses the theory of the generic GR algorithm, including special cases (for example, QR, SR, HR), and the development of Krylov subspace methods. This book also addresses a generic Krylov process and the Arnoldi and various Lanczos algorithms, which are obtained as special cases. Theoretical and computational exercises guide students, step by step, to the results. Downloadable MATLAB programs, compiled by the author, are available on a supplementary Web site. Readers of this book are expected to be familiar with the basic ideas of linear algebra and to have had some experience with matrix computations. Ideal for graduate students, or as a reference book for researchers and users of eigenvalue codes.
Now thoroughly updated to include new advances in the field,and with regular content updates to the eBook, Principles and Practice of Pediatric Oncology, 7th Edition remains the gold standard text for the care and research of children with cancer. This authoritative reference is the single most comprehensive resource on the biology and genetics of childhood cancer and the diagnosis, multimodal treatment, and long-term management of young patients with cancer. Also addressed are a broad array of topics on the supportive and psychosocial aspects of care of children and families. Covering virtually every aspect of the breadth and depth of childhood cancer, this 7th Edition provides expert guidance on state-of-the-art, multidisciplinary care for children and families. Stay up to date with the most recent advances in the field with the contributions by new and returning contributors, including the perspective from patients and parents in the chapter titled “The Other Side of the Bed.” Reference your eBook version for key updates in the field during the life of the edition! Chapters included on palliative care and education. Supportive care is covered broadly and specifically – in contexts such as emergencies, infectious disease, and nutrition. The most updated and authoritative information is provided by the leading experts in the field. Gain a thorough understanding of every aspect of pediatric oncology, with comprehensive information regarding basic science, diagnostic tools, principles of treatment, and clinical trials, as well as highly detailed, definitive coverage of each pediatric malignancy. Collaborate more effectively with others on the cancer care team to enhance quality-of-life issues for patients and families. Understand the cooperative nature of pediatric oncology as a model for cancer research with information from cooperative clinical trial groups and consortia.
Chebyshev polynomials crop up in virtually every area of numerical analysis, and they hold particular importance in recent advances in subjects such as orthogonal polynomials, polynomial approximation, numerical integration, and spectral methods. Yet no book dedicated to Chebyshev polynomials has been published since 1990, and even that work focuse
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