In image processing, the rapid approximate solution of variational problems involving generic data-fitting terms is often of practical relevance, for example in real-time applications. Variational solvers based on diffusion schemes or the Euler-Lagrange equations are too slow and restricted in the types of data-fitting terms. Here, we present a filter-based approach to reduce variational energies that contain generic data-fitting terms, but are restricted to specific regularizations. Our approach is based on reducing the regularization part of the variational energy, while guaranteeing non-increasing total energy. This is applicable to regularization-dominated models, where the data-fitting energy initially increases, while the regularizati...
We propose an energy-based framework for approximating surfaces from a cloud of point measurements c...
<p><strong>The mathematical approach calculus of variation is commonly used to find an unknown funct...
Abstract. We introduce a generic convex energy functional that is suitable for both grayscale and ve...
Minimization functionals related to Euler's elastica energy has a broad range of applications in com...
Discrete gradient methods are well-known methods of geometric numerical integration, which preserve ...
International audienceIn the usual non-local variational models, such as the non-local total variati...
In this paper, motivated by approximating the Euler-Lagrange equation of the pth-order regularizatio...
We consider curvature depending variational models for image regularization, such as Euler's elastic...
The geometric high-order regularization methods such as mean curvature and Gaussian curvature, have ...
This paper concerns an optimization algorithm for unconstrained nonconvex problems where the objecti...
International audienceThe paper is concerned with the analysis of a new variational model torestore ...
International audienceWe consider curvature depending variational models for image regularization, s...
This paper arose from a minisymposium held in 2018 at the 9th International Conference on Curves and...
Abstract In this article we introduce a novel method for the image de-noising which combines a mathe...
In many imaging applications where segmented features (e.g. blood vessels) are further used for othe...
We propose an energy-based framework for approximating surfaces from a cloud of point measurements c...
<p><strong>The mathematical approach calculus of variation is commonly used to find an unknown funct...
Abstract. We introduce a generic convex energy functional that is suitable for both grayscale and ve...
Minimization functionals related to Euler's elastica energy has a broad range of applications in com...
Discrete gradient methods are well-known methods of geometric numerical integration, which preserve ...
International audienceIn the usual non-local variational models, such as the non-local total variati...
In this paper, motivated by approximating the Euler-Lagrange equation of the pth-order regularizatio...
We consider curvature depending variational models for image regularization, such as Euler's elastic...
The geometric high-order regularization methods such as mean curvature and Gaussian curvature, have ...
This paper concerns an optimization algorithm for unconstrained nonconvex problems where the objecti...
International audienceThe paper is concerned with the analysis of a new variational model torestore ...
International audienceWe consider curvature depending variational models for image regularization, s...
This paper arose from a minisymposium held in 2018 at the 9th International Conference on Curves and...
Abstract In this article we introduce a novel method for the image de-noising which combines a mathe...
In many imaging applications where segmented features (e.g. blood vessels) are further used for othe...
We propose an energy-based framework for approximating surfaces from a cloud of point measurements c...
<p><strong>The mathematical approach calculus of variation is commonly used to find an unknown funct...
Abstract. We introduce a generic convex energy functional that is suitable for both grayscale and ve...