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Inverse problems for multivelocity transfer equation in the plane-symmetric case
Veröffentlicht/Copyright:
7. September 2013
Abstract
- In this paper we research three inverse problems for multivelocity equation for particle transfer. In the domain where the integral density of the particle flow is measured the inverse problems are reduced to the Cauchy problem for an analytic function. This allows us to establish the uniqueness theorems and to obtain the formulas of Carleman type for solutions of inverse problems in the whole domain of particle transfer.
Published Online: 2013-09-07
Published in Print: 2000-08
© 2013 by Walter de Gruyter GmbH & Co.
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Artikel in diesem Heft
- CONTENTS
- On the Cauchy problem for a differential equation with unbounded operator coefficients
- Reconstruction of the support function for inclusion from boundary measurements
- Identifiability of distributed parameters in beam-type systems
- The problem of dynamical reconstruction of Dirichlet boundary control in semilinear hyperbolic equations
- An inverse problem related to layered elastic plate
- Necessary and sufficient conditions of convergence of finite-dimensional approximations for L-regularized solutions of operator equations
- Inverse problems for multivelocity transfer equation in the plane-symmetric case
Artikel in diesem Heft
- CONTENTS
- On the Cauchy problem for a differential equation with unbounded operator coefficients
- Reconstruction of the support function for inclusion from boundary measurements
- Identifiability of distributed parameters in beam-type systems
- The problem of dynamical reconstruction of Dirichlet boundary control in semilinear hyperbolic equations
- An inverse problem related to layered elastic plate
- Necessary and sufficient conditions of convergence of finite-dimensional approximations for L-regularized solutions of operator equations
- Inverse problems for multivelocity transfer equation in the plane-symmetric case
