New results on the degree of ill-posedness for integration operators with weights

Hofmann, Bernd, von Wolfersdorf, Lothar

16 May 2008

We extend our results on the degree of ill-posedness for linear integration opera- tors A with weights mapping in the Hilbert space L^2(0,1), which were published in the journal 'Inverse Problems' in 2005 ([5]). Now we can prove that the degree one also holds for a family of exponential weight functions. In this context, we empha- size that for integration operators with outer weights the use of the operator AA^* is more appropriate for the analysis of eigenvalue problems and the corresponding asymptotics of singular values than the former use of A^*A.

Bessel function

Compact integral operator

Degree of ill-posedness

Singular value asymptotics

ddc:510

Eigenwertproblem

Inverses Problem

Ill-Posedness Aspects of Some Nonlinear Inverse Problems and their Linearizations

Fleischer, G., Hofmann, B.

30 October 1998

In this paper we deal with aspects of characterizing the ill-posedn ess of nonlinear inverse problems based on the discussion of specific examples. In particular, a parameter identification problem to a second order differential equation and its ill-posed linear components are under consideration. A new approach to the classification ofill-posedness degrees for multiplication operators completes the paper.

degree of ill-posedness

multiplication op erators

nonlinear inverse problems

parameter identification

MSC 65J20

MSC 47B38

ddc:510

Ill-Posedness Aspects of Some Nonlinear Inverse Problems and their Linearizations

Fleischer, G., Hofmann, B.

30 October 1998

In this paper we deal with aspects of characterizing the ill-posedn ess of nonlinear inverse problems based on the discussion of specific examples. In particular, a parameter identification problem to a second order differential equation and its ill-posed linear components are under consideration. A new approach to the classification ofill-posedness degrees for multiplication operators completes the paper.

info:eu-repo/classification/ddc/510

ddc:510

degree of ill-posedness

multiplication op erators

nonlinear inverse problems

parameter identification

MSC 65J20

MSC 47B38

New results on the degree of ill-posedness for integration operators with weights

Hofmann, Bernd, von Wolfersdorf, Lothar

16 May 2008

We extend our results on the degree of ill-posedness for linear integration opera- tors A with weights mapping in the Hilbert space L^2(0,1), which were published in the journal 'Inverse Problems' in 2005 ([5]). Now we can prove that the degree one also holds for a family of exponential weight functions. In this context, we empha- size that for integration operators with outer weights the use of the operator AA^* is more appropriate for the analysis of eigenvalue problems and the corresponding asymptotics of singular values than the former use of A^*A.

info:eu-repo/classification/ddc/510

ddc:510

Eigenwertproblem

Inverses Problem

Bessel function

Compact integral operator

Degree of ill-posedness

Singular value asymptotics