In this paper we deal with the `strength' of ill-posedness for ill-posed linear operator equations Ax = y in Hilbert spaces, where we distinguish according_to_M. Z. Nashed [15] the ill-posedness of type I if A is not compact, but we have R(A) 6= R(A) for the range R(A) of A; and the ill-posedness of type II for compact operators A: From our considerations it seems to follow that the problems with noncompact operators A are not in general `less' ill-posed than the problems with compact operators. We motivate this statement by comparing the approximation and stability behaviour of discrete least-squares solutions and the growth rate of Galerkin matrices in both cases. Ill-posedness measures for compact operators A as discussed in [10] are de...
In this paper we deal with aspects of characterizing the ill-posedn ess of nonlinear inverse problem...
The stable approximate solution of ill-posed linear operator equations in Hilbert spaces requires re...
We prove some sufficient conditions for obtaining convergence rates in regula-rization of linear ill...
In this paper we deal with the `strength' of ill-posedness for ill-posed linear operator equations A...
In this paper, we study ill-posedness concepts of nonlinear and linear inverse problems in a Hilbert...
In this thesis we deal with the degree of ill-posedness of linear operator equations in Hilbert spac...
We revisit in L2-spaces the autoconvolution equation x ∗ x = y with solutions which are real-valued ...
We deal with locally ill-posed nonlinear operator equations F(x) = y in L^2(0,1), where the Fréchet ...
We characterize those linear optimization problems that are ill-posed in the sense that arbitrarily ...
AbstractWe characterize those linear optimization problems that are ill-posed in the sense that arbi...
We introduce the notion of the degree of ill--posedness of linear operators in operator equations be...
The paper is devoted to the analysis of ill-posed operator equations Ax = y with injective linear op...
Ill-posed problems Ax = h are discussed in which A is Hermitian,and postive definite; a bound ║Bx║ ≤...
It is shown that Tikhonov regularization for ill- posed operator equation \(Kx = y\) using a possib...
The characterization of the local ill-posedness and the local degree of nonlinearity are of particul...
In this paper we deal with aspects of characterizing the ill-posedn ess of nonlinear inverse problem...
The stable approximate solution of ill-posed linear operator equations in Hilbert spaces requires re...
We prove some sufficient conditions for obtaining convergence rates in regula-rization of linear ill...
In this paper we deal with the `strength' of ill-posedness for ill-posed linear operator equations A...
In this paper, we study ill-posedness concepts of nonlinear and linear inverse problems in a Hilbert...
In this thesis we deal with the degree of ill-posedness of linear operator equations in Hilbert spac...
We revisit in L2-spaces the autoconvolution equation x ∗ x = y with solutions which are real-valued ...
We deal with locally ill-posed nonlinear operator equations F(x) = y in L^2(0,1), where the Fréchet ...
We characterize those linear optimization problems that are ill-posed in the sense that arbitrarily ...
AbstractWe characterize those linear optimization problems that are ill-posed in the sense that arbi...
We introduce the notion of the degree of ill--posedness of linear operators in operator equations be...
The paper is devoted to the analysis of ill-posed operator equations Ax = y with injective linear op...
Ill-posed problems Ax = h are discussed in which A is Hermitian,and postive definite; a bound ║Bx║ ≤...
It is shown that Tikhonov regularization for ill- posed operator equation \(Kx = y\) using a possib...
The characterization of the local ill-posedness and the local degree of nonlinearity are of particul...
In this paper we deal with aspects of characterizing the ill-posedn ess of nonlinear inverse problem...
The stable approximate solution of ill-posed linear operator equations in Hilbert spaces requires re...
We prove some sufficient conditions for obtaining convergence rates in regula-rization of linear ill...