International audienceWe consider curvature depending variational models for image regularization, such as Euler's elastica. These models are known to provide strong priors for the continuity of edges and hence have important applications in shape-and image processing. We consider a lifted convex representation of these models in the roto-translation space: In this space, curvature depending variational energies are represented by means of a convex functional defined on divergence free vector fields. The line energies are then easily extended to any scalar function. It yields a natural generalization of the total variation to the roto-translation space. As our main result, we show that the proposed convex representation is tight for charact...
Total variation regularization and total variation flows (TVF) have been widely applied for image en...
We propose an adaptive implementation of a Crouzeix-Raviart based discretization of the total variat...
Convex variational problems arise in many fields ranging from image processing to fluid and solid me...
International audienceWe consider curvature depending variational models for image regularization, s...
We consider curvature depending variational models for image regularization, such as Euler's elastic...
Minimization functionals related to Euler's elastica energy has a broad range of applications in com...
In image processing, the rapid approximate solution of variational problems involving generic data-f...
Variational models constitute a foundation for the formulation and understanding of models in many a...
Total variation regularization and total variation flows (TVF) have beenwidely applied for image enh...
International audienceRecent works have indicated the potential of using curvature as a regularizer ...
This thesis is concerned with applying the total variation (TV) regularizer to surfaces and differen...
International audienceThe paper is concerned with the analysis of a new variational model torestore ...
In this work, we investigate image registration in a variational framework and focus on regularizati...
Abstract. We propose a convex, lower semi-continuous, coercive approximation of Euler’s elastica ene...
Abstract. We propose a convex, lower semi-continuous, coercive approximation of Euler’s elastica ene...
Total variation regularization and total variation flows (TVF) have been widely applied for image en...
We propose an adaptive implementation of a Crouzeix-Raviart based discretization of the total variat...
Convex variational problems arise in many fields ranging from image processing to fluid and solid me...
International audienceWe consider curvature depending variational models for image regularization, s...
We consider curvature depending variational models for image regularization, such as Euler's elastic...
Minimization functionals related to Euler's elastica energy has a broad range of applications in com...
In image processing, the rapid approximate solution of variational problems involving generic data-f...
Variational models constitute a foundation for the formulation and understanding of models in many a...
Total variation regularization and total variation flows (TVF) have beenwidely applied for image enh...
International audienceRecent works have indicated the potential of using curvature as a regularizer ...
This thesis is concerned with applying the total variation (TV) regularizer to surfaces and differen...
International audienceThe paper is concerned with the analysis of a new variational model torestore ...
In this work, we investigate image registration in a variational framework and focus on regularizati...
Abstract. We propose a convex, lower semi-continuous, coercive approximation of Euler’s elastica ene...
Abstract. We propose a convex, lower semi-continuous, coercive approximation of Euler’s elastica ene...
Total variation regularization and total variation flows (TVF) have been widely applied for image en...
We propose an adaptive implementation of a Crouzeix-Raviart based discretization of the total variat...
Convex variational problems arise in many fields ranging from image processing to fluid and solid me...