We deal with locally ill-posed nonlinear operator equations F(x) = y in L^2(0,1), where the Fréchet derivatives A = F'(x_0) of the nonlinear forward operator F are compact linear integral operators A = M ◦ J with a multiplication operator M with integrable multiplier function m and with the simple integration operator J. In particular, we give examples of nonlinear inverse problems in natural sciences and stochastic finance that can be written in such a form with linearizations that contain multiplication operators. Moreover, we consider the corresponding ill-posed linear operator equations Ax = y and their degree of ill-posedness. In particular, we discuss the fact that the noncompact multiplication operator M has only a restricted influen...
We study the solutions of the inverse problem g(z)=∫f(y)P T(z,dy)for a given g, where (P t(⋅,⋅)) t≥0...
AbstractIn this work, firstly we describe all normal extensions of a minimal operator generated by l...
Non-negative operators, in special case non-negative matrices, are an interesting topics for many sc...
We deal with locally ill-posed nonlinear operator equations F(x) = y in L^2(0,1), where the Fréchet ...
In this thesis we deal with the degree of ill-posedness of linear operator equations in Hilbert spac...
In this paper we deal with aspects of characterizing the ill-posedn ess of nonlinear inverse problem...
In this paper, we study ill-posedness concepts of nonlinear and linear inverse problems in a Hilbert...
In this paper we deal with the `strength' of ill-posedness for ill-posed linear operator equations A...
We introduce the notion of the degree of ill--posedness of linear operators in operator equations be...
We revisit in L2-spaces the autoconvolution equation x ∗ x = y with solutions which are real-valued ...
This paper considers the estimation of an unknown function h that can be characterized as a solution...
AbstractA (stochastic) operator-theoretic approach leads to expresssions for inverses of linear and ...
The characterization of the local ill-posedness and the local degree of nonlinearity are of particul...
This paper deals with the characterization of multiplication operators, especially with its behavior...
We consider a Backward Stochastic Differential Equation (BSDE for short) in a Markovian framework fo...
We study the solutions of the inverse problem g(z)=∫f(y)P T(z,dy)for a given g, where (P t(⋅,⋅)) t≥0...
AbstractIn this work, firstly we describe all normal extensions of a minimal operator generated by l...
Non-negative operators, in special case non-negative matrices, are an interesting topics for many sc...
We deal with locally ill-posed nonlinear operator equations F(x) = y in L^2(0,1), where the Fréchet ...
In this thesis we deal with the degree of ill-posedness of linear operator equations in Hilbert spac...
In this paper we deal with aspects of characterizing the ill-posedn ess of nonlinear inverse problem...
In this paper, we study ill-posedness concepts of nonlinear and linear inverse problems in a Hilbert...
In this paper we deal with the `strength' of ill-posedness for ill-posed linear operator equations A...
We introduce the notion of the degree of ill--posedness of linear operators in operator equations be...
We revisit in L2-spaces the autoconvolution equation x ∗ x = y with solutions which are real-valued ...
This paper considers the estimation of an unknown function h that can be characterized as a solution...
AbstractA (stochastic) operator-theoretic approach leads to expresssions for inverses of linear and ...
The characterization of the local ill-posedness and the local degree of nonlinearity are of particul...
This paper deals with the characterization of multiplication operators, especially with its behavior...
We consider a Backward Stochastic Differential Equation (BSDE for short) in a Markovian framework fo...
We study the solutions of the inverse problem g(z)=∫f(y)P T(z,dy)for a given g, where (P t(⋅,⋅)) t≥0...
AbstractIn this work, firstly we describe all normal extensions of a minimal operator generated by l...
Non-negative operators, in special case non-negative matrices, are an interesting topics for many sc...