The purpose of the present chapter is to bind together and extend some recent developments regarding data-driven nonsmooth regularization techniques in image processing through the means of a bilevel minimization scheme. The scheme, considered in function space, takes advantage of a dualization framework and it is designed to produce spatially varying regularization parameters adapted to the data for well-known regularizers, e.g., total variation and total generalized variation, leading to automated (monolithic), image reconstruction workflows. An inclusion of the theory of bilevel optimization and the theoretical background of the dualization framework, as well as a brief review of the aforementioned regularizers and their parameterization...
Image restoration often requires the minimization of a convex, possibly nonsmooth functional, given ...
AbstractWe study the qualitative properties of optimal regularisation parameters in variational mode...
Image restoration often requires the minimization of a convex, possibly nonsmooth functional, given ...
The purpose of the present chapter is to bind together and extend some recent developments regarding...
Abstract. In this work we consider the regularization of vectorial data such as color images. Based ...
Based on the weighted total variation model and its analysis pursued in Hintermüller and Rautenberg ...
Abstract. We consider a bilevel optimization approach for parameter learning in nonsmooth variationa...
Total Generalized Variation (TGV) regularization in image reconstruction relies on an infimal convol...
We consider a bilevel optimisation approach for parameter learning in higher-order total variation i...
We consider a bilevel optimization approach in function space for the choice of spatially dependent ...
Abstract—Nonconvex nonsmooth regularization has advantages over convex regularization for restoring ...
In the context of image processing, given a $k$-th order, homogeneous and linear differential operat...
A popular strategy for determining solutions to linear least-squares problems relies on using sparsi...
We study the qualitative properties of optimal regularisation parameters in variational models for i...
A weighted total variation model with a spatially varying regularization weight is considered. Exist...
Image restoration often requires the minimization of a convex, possibly nonsmooth functional, given ...
AbstractWe study the qualitative properties of optimal regularisation parameters in variational mode...
Image restoration often requires the minimization of a convex, possibly nonsmooth functional, given ...
The purpose of the present chapter is to bind together and extend some recent developments regarding...
Abstract. In this work we consider the regularization of vectorial data such as color images. Based ...
Based on the weighted total variation model and its analysis pursued in Hintermüller and Rautenberg ...
Abstract. We consider a bilevel optimization approach for parameter learning in nonsmooth variationa...
Total Generalized Variation (TGV) regularization in image reconstruction relies on an infimal convol...
We consider a bilevel optimisation approach for parameter learning in higher-order total variation i...
We consider a bilevel optimization approach in function space for the choice of spatially dependent ...
Abstract—Nonconvex nonsmooth regularization has advantages over convex regularization for restoring ...
In the context of image processing, given a $k$-th order, homogeneous and linear differential operat...
A popular strategy for determining solutions to linear least-squares problems relies on using sparsi...
We study the qualitative properties of optimal regularisation parameters in variational models for i...
A weighted total variation model with a spatially varying regularization weight is considered. Exist...
Image restoration often requires the minimization of a convex, possibly nonsmooth functional, given ...
AbstractWe study the qualitative properties of optimal regularisation parameters in variational mode...
Image restoration often requires the minimization of a convex, possibly nonsmooth functional, given ...