Recent Topics in Nonlinear Partial Diffe
โ M. Mimura, T. Nishida
๐ Library
๐
1984
๐ Elsevier Science Ltd
๐ English
โฆ LIBER โฆ
๐
Recent Developments in Nonlinear Partial Differential Equations
โ Scribed by Donatella Danielli (ed.)
- Publisher
- Amer Mathematical Society
- Year
- 2007
- Tongue
- English
- Leaves
- 146
- Series
- Contemporary Mathematics 439
- Category
- Library
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โฆ Synopsis
This volume contains research and expository articles based on talks presented at the 2nd Symposium on Analysis and PDEs, held at Purdue University. The Symposium focused on topics related to the theory and applications of nonlinear partial differential equations that are at the forefront of current international research. Papers in this volume provide a comprehensive account of many of the recent developments in the field. The topics featured in this volume include: kinetic formulations of nonlinear PDEs; recent unique continuation results and their applications; concentrations and constrained Hamilton-Jacobi equations; nonlinear Schrodinger equations; quasiminimal sets for Hausdorff measures; Schrodinger flows into Kahler manifolds; and parabolic obstacle problems with applications to finance. The clear and concise presentation in many articles makes this volume suitable for both researchers and graduate students
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The articles of this book are written by leading experts in partial differential equations and their applications, who present overviews here of recent advances in this broad area of mathematics. The formation of shocks in fluids, modern numerical computation of turbulence, the breaking of the Einst
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๐ Amer Mathematical Society
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Nonlinear partial differential equations
โ Robert Hardt and Michael Wolf, Robert Hardt, Michael Wolf
๐ Library
๐
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๐ American Mathematical Society, IAS/Park City Mathe
๐ English
What distinguishes differential geometry in the last half of the twentieth century from its earlier history is the use of nonlinear partial differential equations in the study of curved manifolds, submanifolds, mapping problems, and function theory on manifolds, among other topics. The differential