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We give a derivation of an a-posteriori strategy for choosing the regularization parameter in Tikhonov regularization for solving nonlinear ill-posed problems, which leads to optimal convergence rates. This strategy requires a special stability estimate for the regularized solutions. A new proof fot this stability estimate is given.
The goal of our paper is to introduce basis functions for the finite element discretization of a second order linear elliptic
operator with rough or highly oscillating coefficients.
The proposed basis functions are inspired by the classic idea of component
mode synthesis and exploit an orthogonal decomposition
of the trial subspace to minimize the energy.
Numerical experiments illustrate the effectiveness of the proposed basis functions.
In this paper we consider the eigenvalue problem for positive definite symmetric matrices. Convergence properties for the zero shift method and the shift Cholesky method both in restoring and in non restoring version are deduced from the convergence properties of triangular matrices sequences. For general matrices we obtain some results on the convergence speed of the Cholesky method as a function of the chosen shift. These results follow from the absolute convergence of numerical series associated...
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