Overview
- Authors:
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Georges Duvaut
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Mécanique Théoretique, Université de Paris VI, Paris, France
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Jacques Louis Lions
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Collège de France, Paris, France
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Table of contents (7 chapters)
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- Georges Duvaut, Jacques Louis Lions
Pages 1-76
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- Georges Duvaut, Jacques Louis Lions
Pages 77-101
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- Georges Duvaut, Jacques Louis Lions
Pages 102-196
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- Georges Duvaut, Jacques Louis Lions
Pages 197-227
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- Georges Duvaut, Jacques Louis Lions
Pages 228-277
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- Georges Duvaut, Jacques Louis Lions
Pages 278-327
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- Georges Duvaut, Jacques Louis Lions
Pages 328-381
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Back Matter
Pages 382-400
About this book
1. We begin by giving a simple example of a partial differential inequality that occurs in an elementary physics problem. We consider a fluid with pressure u(x, t) at the point x at the instant t that 3 occupies a region Q oflR bounded by a membrane r of negligible thickness that, however, is semi-permeable, i. e., a membrane that permits the fluid to enter Q freely but that prevents all outflow of fluid. One can prove then (cf. the details in Chapter 1, Section 2.2.1) that au (aZu azu aZu) (1) in Q, t>o, -a - du = g du = -a z + -a z + -a z t Xl X X3 z l g a given function, with boundary conditions in the form of inequalities u(X,t»o => au(x,t)/an=O, XEr, (2) u(x,t)=o => au(x,t)/an?:O, XEr, to which is added the initial condition (3) u(x,O)=uo(x). We note that conditions (2) are non linear; they imply that, at each fixed instant t, there exist on r two regions r~ and n where u(x, t) =0 and au (x, t)/an = 0, respectively. These regions are not prescribed; thus we deal with a "free boundary" problem.
Authors and Affiliations
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Mécanique Théoretique, Université de Paris VI, Paris, France
Georges Duvaut
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Collège de France, Paris, France
Jacques Louis Lions