Any image can be represented as a function defined on a weighted graph, in which the underlying structure of the image is encoded in kernel similarity and associated Laplacian matrices. In this paper, we develop an iterative graph-based framework for image restoration based on a new definition of the normalized graph Laplacian. We propose a cost function which consists of a new data fidelity term and a regularization term derived from the specific definition of the normalized graph Laplacian. The normalizing coefficients used in the definition of the Laplacian and the associated regularization term are obtained using fast symmetry preserving matrix balancing. This results in some desired spectral properties for the normalized Laplacian such...
Images and videos are often captured in poor light condi-tions, resulting in low-contrast images tha...
Digital restoration of image with missing data is a basic need for visual communication and industri...
Abstract. In many inverse problems it is essential to use regularization methods that preserve edges...
Digital photography has experienced great progress during the past decade. A lot of people are recor...
In this paper, we develop a regularization framework for image deblurring based on a new definition ...
The use of the Laplacian of a properly constructed graph for denoising images has attracted a lot of...
In this paper, we propose a unified framework to perform progressive image restoration based on hybr...
The use of the Laplacian of a properly constructed graph for denoising images has attracted a lot of...
Recovering images from corrupted observations is necessary for many real-world applications. In this...
Image deblurring is a relevant problem in many fields of science and engineering. To solve this prob...
Given we live in a digital age where images are regularly being viewed, posted, or utilized, spectat...
We have recently introduced a class of non-quadratic Hessian-based regularizers as a higher-order ex...
Abstract—Image denoising is the most basic inverse imaging problem. As an under-determined problem, ...
Image deblurring is a relevant problem in many fields of science and engineering. To solve this prob...
This thesis explores graph-based regularization techniques for inverse problems in imaging and visio...
Images and videos are often captured in poor light condi-tions, resulting in low-contrast images tha...
Digital restoration of image with missing data is a basic need for visual communication and industri...
Abstract. In many inverse problems it is essential to use regularization methods that preserve edges...
Digital photography has experienced great progress during the past decade. A lot of people are recor...
In this paper, we develop a regularization framework for image deblurring based on a new definition ...
The use of the Laplacian of a properly constructed graph for denoising images has attracted a lot of...
In this paper, we propose a unified framework to perform progressive image restoration based on hybr...
The use of the Laplacian of a properly constructed graph for denoising images has attracted a lot of...
Recovering images from corrupted observations is necessary for many real-world applications. In this...
Image deblurring is a relevant problem in many fields of science and engineering. To solve this prob...
Given we live in a digital age where images are regularly being viewed, posted, or utilized, spectat...
We have recently introduced a class of non-quadratic Hessian-based regularizers as a higher-order ex...
Abstract—Image denoising is the most basic inverse imaging problem. As an under-determined problem, ...
Image deblurring is a relevant problem in many fields of science and engineering. To solve this prob...
This thesis explores graph-based regularization techniques for inverse problems in imaging and visio...
Images and videos are often captured in poor light condi-tions, resulting in low-contrast images tha...
Digital restoration of image with missing data is a basic need for visual communication and industri...
Abstract. In many inverse problems it is essential to use regularization methods that preserve edges...