We present exploratory data analysis methods to assess inversion estimates using examples based on l(2)- and l(1)-regularization. These methods can be used to reveal the presence of systematic errors such as bias and discretization effects, or to validate assumptions made on the statistical model used in the analysis. The methods include bounds on the performance of randomized estimators of a large matrix, confidence intervals and bounds for the bias, resampling methods for model validation and construction of training sets of functions with controlled local regularity
Inverse methods have known a very important development in thegeosciences these last years. Most of ...
We propose a new method for constructing confidence intervals in a class of linear inverse problems....
Abstract. We address discrete nonlinear inverse problems with weighted least squares and Tikhonov re...
Modeling and Inverse Problems in the Presence of Uncertainty collects recent research-including the ...
Inverse problems arise in many applications in science and engineering. They are characterized by th...
Large-scale inverse problems and associated uncertainty quantification has become an important area ...
Quantifying uncertainty in the solution of inverse problems is an exciting area of ...
Abstract:- All regularization methods for computing stable solutions to inverse problems, involve a ...
We computationally investigate two approaches for uncertainty quantification in inverse problems for...
Inverse problems play a key role in modern image/signal processing methods. However, since they are ...
We consider the computational challenges associated with uncertainty quantification in high-dimensio...
The development of computational algorithms for solving inverse problems is, and has been, a primary...
We propose a new method for constructing confidence intervals in a class of linear inverse problems....
In order to apply nonlinear inversion methods to realistic data sets, effective regularization metho...
A convergence rate analysis is an important tool to assess the qual-ity of regularization methods fo...
Inverse methods have known a very important development in thegeosciences these last years. Most of ...
We propose a new method for constructing confidence intervals in a class of linear inverse problems....
Abstract. We address discrete nonlinear inverse problems with weighted least squares and Tikhonov re...
Modeling and Inverse Problems in the Presence of Uncertainty collects recent research-including the ...
Inverse problems arise in many applications in science and engineering. They are characterized by th...
Large-scale inverse problems and associated uncertainty quantification has become an important area ...
Quantifying uncertainty in the solution of inverse problems is an exciting area of ...
Abstract:- All regularization methods for computing stable solutions to inverse problems, involve a ...
We computationally investigate two approaches for uncertainty quantification in inverse problems for...
Inverse problems play a key role in modern image/signal processing methods. However, since they are ...
We consider the computational challenges associated with uncertainty quantification in high-dimensio...
The development of computational algorithms for solving inverse problems is, and has been, a primary...
We propose a new method for constructing confidence intervals in a class of linear inverse problems....
In order to apply nonlinear inversion methods to realistic data sets, effective regularization metho...
A convergence rate analysis is an important tool to assess the qual-ity of regularization methods fo...
Inverse methods have known a very important development in thegeosciences these last years. Most of ...
We propose a new method for constructing confidence intervals in a class of linear inverse problems....
Abstract. We address discrete nonlinear inverse problems with weighted least squares and Tikhonov re...