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Generalized Solutions of First Order PDEs Andrei I. Subbotin

Generalized Solutions of First Order PDEs By Andrei I. Subbotin

Generalized Solutions of First Order PDEs by Andrei I. Subbotin


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Summary

This text presents an approach to partial differential equations that can be considered as a non-classical method of characteristics, according to which the generalized solution (the minimax solution) is assumed to be flow invariant with respect to the so-called characteristic inclusions.

Generalized Solutions of First Order PDEs Summary

Generalized Solutions of First Order PDEs: The Dynamical Optimization Perspective by Andrei I. Subbotin

Hamilton-Jacobi equations and other types of partial differential equa- tions of the first order are dealt with in many branches of mathematics, mechanics, and physics. These equations are usually nonlinear, and func- tions vital for the considered problems are not smooth enough to satisfy these equations in the classical sense. An example of such a situation can be provided by the value function of a differential game or an optimal control problem. It is known that at the points of differentiability this function satisfies the corresponding Hamilton-Jacobi-Isaacs-Bellman equation. On the other hand, it is well known that the value function is as a rule not everywhere differentiable and therefore is not a classical global solution. Thus in this case, as in many others where first-order PDE's are used, there arises necessity to introduce a notion of generalized solution and to develop theory and methods for constructing these solutions. In the 50s-70s, problems that involve nonsmooth solutions of first- order PDE's were considered by Bakhvalov, Evans, Fleming, Gel'fand, Godunov, Hopf, Kuznetzov, Ladyzhenskaya, Lax, Oleinik, Rozhdestven- ski1, Samarskii, Tikhonov, and other mathematicians. Among the inves- tigations of this period we should mention the results of S.N. Kruzhkov, which were obtained for Hamilton-Jacobi equation with convex Hamilto- nian. A review of the investigations of this period is beyond the limits of the present book. A sufficiently complete bibliography can be found in [58, 126, 128, 141].

Generalized Solutions of First Order PDEs Reviews

Subbotin's book is a very valuable addition to the literature.
- Mathematical Reviews

The book is printed excellently and clearly. The explanations concerning the content are distinguished of high correctness and equipped with numerous examples and illustrations.
- ZAA

Table of Contents

I Generalized Characteristics of First-Order PDE's.- II Cauchy Problems for Hamilton-Jacobi Equations.- III Differential Games.- IV Boundary-Value Problems for First-Order PDE's.- A1 Justification of the Classical Method of Characteristics.- A2 Multifunctions.- A3 Semicontinuous Functions.- A4 Convex Functions.- A5 Contingent Tangent Cones, Directional Derivatives, Subdifferentials.- A6 On a Property of Subdifferentials.- A7 Differential Inclusions.- A8 Criteria for Weak Invariance.

Additional information

NPB9780817637408
9780817637408
0817637400
Generalized Solutions of First Order PDEs: The Dynamical Optimization Perspective by Andrei I. Subbotin
New
Hardback
Birkhauser Boston Inc
1994-12-22
314
N/A
Book picture is for illustrative purposes only, actual binding, cover or edition may vary.
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