The use of the Laplacian of a properly constructed graph for denoising images has attracted a lot of attention in the last years. Recently, a way to use this instrument for image deblurring has been proposed. Even though the previously proposed method was able to provide extremely accurate reconstructions, it had several limitations, namely it was only applicable when periodic boundary conditions were employed, the regularization parameter had to be hand-tuned, and only convex regularization terms were allowed. In this paper, we propose two automatic methods that do not need the tuning of any parameter and that can be used for different imaging problems. Moreover, thanks to the projection into properly constructed subspaces of fairly small ...
The original contributions of this paper are twofold: a new understanding of the influence of noise ...
In imaging problems, the graph Laplacian is proven to be a very effective regularization operator wh...
Abstract. In many inverse problems it is essential to use regularization methods that preserve edges...
The use of the Laplacian of a properly constructed graph for denoising images has attracted a lot of...
The use of the Laplacian of a properly constructed graph for denoising images has attracted a lot of...
Image deblurring is a relevant problem in many fields of science and engineering. To solve this prob...
Image deblurring is a relevant problem in many fields of science and engineering. To solve this prob...
In this paper, we develop a regularization framework for image deblurring based on a new definition ...
Any image can be represented as a function defined on a weighted graph, in which the underlying stru...
Image reconstruction problems, like image deblurring and computer tomography, are usually ill-posed ...
Digital photography has experienced great progress during the past decade. A lot of people are recor...
Recovering images from corrupted observations is necessary for many real-world applications. In this...
In this paper, we propose a unified framework to perform progressive image restoration based on hybr...
This thesis explores graph-based regularization techniques for inverse problems in imaging and visio...
Abstract—Image denoising is the most basic inverse imaging problem. As an under-determined problem, ...
The original contributions of this paper are twofold: a new understanding of the influence of noise ...
In imaging problems, the graph Laplacian is proven to be a very effective regularization operator wh...
Abstract. In many inverse problems it is essential to use regularization methods that preserve edges...
The use of the Laplacian of a properly constructed graph for denoising images has attracted a lot of...
The use of the Laplacian of a properly constructed graph for denoising images has attracted a lot of...
Image deblurring is a relevant problem in many fields of science and engineering. To solve this prob...
Image deblurring is a relevant problem in many fields of science and engineering. To solve this prob...
In this paper, we develop a regularization framework for image deblurring based on a new definition ...
Any image can be represented as a function defined on a weighted graph, in which the underlying stru...
Image reconstruction problems, like image deblurring and computer tomography, are usually ill-posed ...
Digital photography has experienced great progress during the past decade. A lot of people are recor...
Recovering images from corrupted observations is necessary for many real-world applications. In this...
In this paper, we propose a unified framework to perform progressive image restoration based on hybr...
This thesis explores graph-based regularization techniques for inverse problems in imaging and visio...
Abstract—Image denoising is the most basic inverse imaging problem. As an under-determined problem, ...
The original contributions of this paper are twofold: a new understanding of the influence of noise ...
In imaging problems, the graph Laplacian is proven to be a very effective regularization operator wh...
Abstract. In many inverse problems it is essential to use regularization methods that preserve edges...