English

On unbounded operators and applications

Spectral Theory 2007-05-23 v1 Numerical Analysis

Abstract

Assume that Au=f,(1)Au=f,\quad (1) is a solvable linear equation in a Hilbert space HH, AA is a linear, closed, densely defined, unbounded operator in HH, which is not boundedly invertible, so problem (1) is ill-posed. It is proved that the closure of the operator (AA+\aI)1A(A^*A+\a I)^{-1}A^*, with the domain D(A)D(A^*), where \a>0\a>0 is a constant, is a linear bounded everywhere defined operator with norm 1\leq 1. This result is applied to the variational problem F(u):=Auf2+\au2=minF(u):= ||Au-f||^2+\a ||u||^2=min, where ff is an arbitrary element of HH, not necessarily belonging to the range of AA. Variational regularization of problem (1) is constructed, and a discrepancy principle is proved.

Keywords

Cite

@article{arxiv.math/0508587,
  title  = {On unbounded operators and applications},
  author = {A. G. Ramm},
  journal= {arXiv preprint arXiv:math/0508587},
  year   = {2007}
}