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This text provides an introduction to the theory of partial differential equations. It introduces basic examples of partial differential equations, arising in continuum mechanics, electromagnetism, complex analysis and other areas, and develops a number of tools for their solution, including particularly Fourier analysis, distribution theory, and Sobolev spaces. These tools are applied to the treatment of basic problems in linear PDE, including the Laplace equation, heat equation, and wave equation, as well as more general elliptic, parabolic, and hyperbolic equations. Companion texts, which take the theory of partial differential equations further, are AMS volume 116, treating more advanced topics in linear PDE, and AMS volume 117, treating problems in nonlinear PDE. This book is addressed to graduate students in mathematics and to professional mathematicians, with an interest in partial differential equations, mathematical physics, differential geometry, harmonic analysis, and complex analysis.
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This chapter examines basic topics in the field of ordinary differential equations (ODE), as it has developed from the era of Newton into modern times. Read the first page
Front Cover | Copyright | Table of Contents | Excerpt | Index | Back Cover
This chapter examines basic topics in the field of ordinary differential equations (ODE), as it has developed from the era of Newton into modern times. Read the first page
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Front Cover | Copyright | Table of Contents | Excerpt | Index | Back Cover
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