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Two results on ill-posed problems

Numerical Analysis 2007-05-23 v1 Functional Analysis

Abstract

Let A=AA=A^* be a linear operator in a Hilbert space HH. Assume that equation Au=f(1)Au=f \quad (1) is solvable, not necessarily uniquely, and yy is its minimal-norm solution. Assume that problem (1) is ill-posed. Let f\df_\d, ffd\d||f-f_d||\leq \d, be noisy data, which are given, while ff is not known. Variational regularization of problem (1) leads to an equation AAu+\au=Af\dA^*Au+\a u=A^*f_\d. Operation count for solving this equation is much higher, than for solving the equation (A+ia)u=f\d(2)(A+ia)u=f_\d \quad (2). The first result is the theorem which says that if a=a(\d)a=a(\d), lim\d0a(\d)=0\lim_{\d \to 0}a(\d)=0 and lim\d0\da(\d)=0\lim_{\d \to 0}\frac \d {a(\d)}=0, then the unique solution u\du_\d to equation (2), with a=a(\d),a=a(\d), has the property lim\d0u\dy=0\lim_{\d \to 0}||u_\d-y||=0. The second result is an iterative method for stable calculation of the values of unbounded operator on elements given with an error.

Keywords

Cite

@article{arxiv.math/0511354,
  title  = {Two results on ill-posed problems},
  author = {A. G. Ramm},
  journal= {arXiv preprint arXiv:math/0511354},
  year   = {2007}
}