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Identifiability of distributed parameters in beam-type systems
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D. Lesnic
Published/Copyright:
September 7, 2013
Abstract
- Necessary and sufficient conditions are established for the identifiability, or non-identifiability, of coefficients, e. g. modulus of elasticity, moment of inertia, conductivity, etc., from prescribed deflection and load acting on a beam associated to the Euler -Bernoulli beam theory.
Published Online: 2013-09-07
Published in Print: 2000-08
© 2013 by Walter de Gruyter GmbH & Co.
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Articles in the same Issue
- 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
Articles in the same Issue
- 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
