Description |
1 online resource |
Series |
Inverse and ill-posed problems series |
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Inverse and ill-posed problems series.
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Contents |
Introduction -- Chapter 1. Solvability of problems of integral geometry -- 1.1. Two-dimensional inverse problem for the transport equation -- 1.2. Three-dimensional inverse problem for the transport equation -- 1.3. Solvability of the problem of integral geometry along geodesics -- 1.4. A planar problem of integral geometry -- 1.5. Certain problems of tomography -- Chapter 2. Inverse problems for kinetic equations -- 2.1. The problem of integral geometry and an inverse problem for the kinetic equation -- 2.2. Linear kinetic equation |
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2.3. A modification of Problem 2.2.12.4. One-dimensional kinetic equation -- 2.5. Equations of the Boltzmann type -- 2.6. The Vlasov system -- 2.7. Some inverse and direct problems for the kinetic equation -- Chapter 3. Evolutionary equations -- 3.1. The Cauchy problem for an integro-differential equation -- 3.2. The problems (3.1.1) -- (3.1.2) for m = 2k + 1, p = 1 (the case of nonperiodic solutions) -- 3.3. Boundary value problems -- 3.4. The Cauchy problem for an evolutionary equation -- 3.5. Inverse problem for an evolutionary equation |
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Chapter 4. Inverse problems for second order differential equations4.1. Quantum kinetic equation -- 4.2. Ultrahyperbolic equation -- 4.3. On a class of multidimensional inverse problems -- 4.4. Inverse problems with concentrated data -- Appendix A -- Bibliography |
Bibliography |
Includes bibliographical references (pages 191-201) |
Notes |
Online resource; title from PDF title page (EBSCO, viewed July 11, 2017) |
Subject |
Integral geometry.
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Inverse problems (Differential equations)
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Chemical kinetics -- Mathematics
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MATHEMATICS -- Geometry -- General.
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Integral geometry
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Inverse problems (Differential equations)
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Form |
Electronic book
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LC no. |
2002284678 |
ISBN |
9783110940947 |
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3110940949 |
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