Hyperbolic Differential Operators and Related Problems Contributor(s): Ancona, Vincenzo (Editor), Vaillant, Jean (Editor) |
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ISBN: 0824709632 ISBN-13: 9780824709631 Publisher: CRC Press OUR PRICE: $332.50 Product Type: Hardcover - Other Formats Published: March 2003 Annotation: Presenting research from more than 30 international authorities, this reference provides a complete arsenal of tools and theorems to analyze systems of hyperbolic partial differential equations. The authors investigate a wide variety of problems in areas such as thermodynamics, electromagnetics, fluid dynamics, differential geometry, and topology. Renewing thought in the field of mathematical physics, Hyperbolic Differential Operators defines the notion of pseudosymmetry for matrix symbols of order zero as well as the notion of time function. Surpassing previously published material on the topic, this text is key for researchers and mathematicians specializing in hyperbolic, Schrdinger, Einstein, and partial differential equations; complex analysis; and mathematical physics. |
Additional Information |
BISAC Categories: - Mathematics | Calculus - Mathematics | Applied - Mathematics | Functional Analysis |
Dewey: 515.724 |
LCCN: 00000000 |
Series: Lecture Notes in Pure and Applied Mathematics |
Physical Information: 0.85" H x 6.98" W x 9.92" (1.47 lbs) 388 pages |
Descriptions, Reviews, Etc. |
Publisher Description: Presenting research from more than 30 international authorities, this reference provides a complete arsenal of tools and theorems to analyze systems of hyperbolic partial differential equations. The authors investigate a wide variety of problems in areas such as thermodynamics, electromagnetics, fluid dynamics, differential geometry, and topology. Renewing thought in the field of mathematical physics, Hyperbolic Differential Operators defines the notion of pseudosymmetry for matrix symbols of order zero as well as the notion of time function. Surpassing previously published material on the topic, this text is key for researchers and mathematicians specializing in hyperbolic, Schr dinger, Einstein, and partial differential equations; complex analysis; and mathematical physics. |