| 書目名稱 | Partial Differential Equations | | 副標題 | Second Edition | | 編輯 | Emmanuele DiBenedetto | | 視頻video | http://file.papertrans.cn/742/741476/741476.mp4 | | 概述 | Self-contained, elementary introduction to PDEs, primarily from a classical perspective.This 2nd edition has been streamlined and rewritten to incorporate years of classroom feedback.Examples, problem | | 叢書名稱 | Cornerstones | | 圖書封面 |  | | 描述 | This is a revised and extended version of my 1995 elementary introduction to partial di?erential equations. The material is essentially the same except for three new chapters. The ?rst (Chapter 8) is about non-linear equations of ?rst order and in particular Hamilton–Jacobi equations. It builds on the continuing idea that PDEs, although a branch of mathematical analysis, are closely related to models of physical phenomena. Such underlying physics in turn provides ideas of solvability. The Hopf variational approach to the Cauchy problem for Hamilton–Jacobi equations is one of the clearest and most incisive examples of such an interplay. The method is a perfect blend of classical mechanics, through the role and properties of the Lagrangian and Hamiltonian, and calculus of variations. A delicate issue is that of identifying “uniqueness classes. ” An e?ort has been made to extract the geometrical conditions on the graph of solutions, such as quasi-concavity, for uniqueness to hold. Chapter 9 is an introduction to weak formulations, Sobolev spaces, and direct variationalmethods for linear and quasi-linearelliptic equations. While terse, the material on Sobolev spaces is reasonably compl | | 出版日期 | Textbook 20102nd edition | | 關(guān)鍵詞 | Boundary value problem; Cauchy--Kowalewski Theorem; Conservation Laws; Degiorgi Classes; Elliptic Theory | | 版次 | 2 | | doi | https://doi.org/10.1007/978-0-8176-4552-6 | | isbn_ebook | 978-0-8176-4552-6Series ISSN 2197-182X Series E-ISSN 2197-1838 | | issn_series | 2197-182X | | copyright | Birkh?user Boston 2010 |
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