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Peter Coker was born in London in 1926. He first studied art at St. Martin's School of Art while working at Odhams Press (1941-1943), a leading publisher of instruction manuals and children's books, and returned as a full-time student (1947-1950) after se
In the 1950s, Peter Coker was among the group of artists, with John Bratby, Jack Smith, Derrick Greaves and Edward Middleditch, who were dubbed the 'Kitchen Sink Group'. This monograph concentrates on Coker's landscape works, with the aim of raising them from the obscurity into which they have fallen compared with his better documented work. Published in association with Abbotts Hall Art Gallery.
The "Nobile Folios," published in association with Piano Nobile, a London art gallery, are gorgeous multidisciplinary explorations of twentieth- and twenty-first-century artworks. Each folio explores a single work, attempting to replicate the experience of seeing it with one's own eyes. New titles this year explore "Sunflowers" 1958/9, a painting by Peter Coker, with ten color images of the work supplemented by an essay by art critic Andrew Lambirth and poetic contemplations by Carrie Etter.
This textbook develops the essential tools of linear algebra, with the goal of imparting technique alongside contextual understanding. Applications go hand-in-hand with theory, each reinforcing and explaining the other. This approach encourages students to develop not only the technical proficiency needed to go on to further study, but an appreciation for when, why, and how the tools of linear algebra can be used across modern applied mathematics. Providing an extensive treatment of essential topics such as Gaussian elimination, inner products and norms, and eigenvalues and singular values, this text can be used for an in-depth first course, or an application-driven second course in linear algebra. In this second edition, applications have been updated and expanded to include numerical methods, dynamical systems, data analysis, and signal processing, while the pedagogical flow of the core material has been improved. Throughout, the text emphasizes the conceptual connections between each application and the underlying linear algebraic techniques, thereby enabling students not only to learn how to apply the mathematical tools in routine contexts, but also to understand what is required to adapt to unusual or emerging problems. No previous knowledge of linear algebra is needed to approach this text, with single-variable calculus as the only formal prerequisite. However, the reader will need to draw upon some mathematical maturity to engage in the increasing abstraction inherent to the subject. Once equipped with the main tools and concepts from this book, students will be prepared for further study in differential equations, numerical analysis, data science and statistics, and a broad range of applications. The first author’s text, Introduction to Partial Differential Equations, is an ideal companion volume, forming a natural extension of the linear mathematical methods developed here.