Identification Problems in Linear Elasticity

## Abstract The aim of this paper is an analysis of geometric inverse problems in linear elasticity and thermoelasticity related to the identification of cavities in two and three spatial dimensions. The overdetermined boundary data used for the reconstruction are the displacement and temperature o

Communicated by P. Werner ## Dedicated to Rolf Leis We use Hodge-Helmholtz decompositions of weighted Sobolev spaces to solve time-harmonic exteriorboundary value problems for perturbations of the (a d#bd )-system ( : the co-differential, a, b'0). We prove, that a Fredholm alternative holds true,

Stationary stochastic inputs are generated from linear processes of the autoregressive moving average type. Since the spectral density of such an input process is nonzero everywhere, this belongs to the class of admissible signals satisfying identifiability requirements. A characterization of the op

In this paper an application of the additive multilevel iteration method to parallel solving of large-scale linear elasticity problems is considered. The results are derived in the framework of the hierarchical basis finite element discretization defined on a tensor product xy ⊗ Tz of one-dimension