The body force in a three-dimensional Lame' system: identification and regularization
Provides a theoretical regularization method for an ill-posed inverse problem in elasticity, but the results are theoretical without numerical validation.
The paper addresses the inverse problem of identifying the spatial component of a body force in a 3D Lamé system from surface stress data, which is ill-posed. A regularized solution is constructed using interpolation and truncated Fourier series with explicit error estimates.
Let a three-dimensional isotropic elastic body be described by the Lamé system with the body force of the form $F(x,t)=ϕ(t)f(x)$, where $ϕ$ is known. We consider the problem of determining the unknown spatial term $f(x)$ of the body force where the surface stress history is given as the overdetermination. This inverse problem is ill-posed. Using the interpolation method and truncated Fourier series, we construct a regularized solution from approximate data and provide explicit error estimates. AMS 2010 Subject Classification: 35L20, 35R30. Keywords: Body force, elastic, ill$-$posed problem, interpolation, Fourier series.