AbstractSignal enhancement and restoration is one of the fields that make extensive use of PDE theory. More specifically, some authors have proposed successive improved shock filters based on non-linear hyperbolic equations. These models yield satisfactory results; however, a wider range of degrees of freedom when handling the model parameters (coefficients and components) would be of great interest because it would increase the model's efficiency and facilitate adaptation to specific situations. Naturally, the key challenge in proceeding thus is to ensure that the problem remains well-posed. In this paper, we propose a more general shock filter that introduces new parameters to control the shock speed. Interpreting the proposed model in a ...
International audienceFollowing the pointwise semigroup approach of [ZH, MZ.1], we establish sharp p...
We study one class of nonlinear fluid dynamic models with impulse source terms. The model consists o...
We first review a general formulation of ray theory and write down the conservation forms of the equ...
AbstractSignal enhancement and restoration is one of the fields that make extensive use of PDE theor...
AbstractIn Part I of this paper, we proposed a well-posed generalized model for signal enhancement a...
AbstractThis paper concerns shock reflection for a system of hyperbolic balance laws in one space di...
In dilation or erosion processes, a shock filter is widely used in signal enhancing or image deburri...
AbstractFor a quasilinear hyperbolic system, we use the method of vanishing viscosity to construct s...
While shock filters are popular morphological image enhancement methods, no well-posedness theory is...
For the structure of a sonic boom produced by a simple aerofoil at it large distance from its source...
Abstract. For a quasilinear hyperbolic system, we use the method of vanishing viscosity to construct...
In this article we study the existence of shock wave solutions for systems of partial differential e...
This thesis consists of an introduction and five papers concerning different numerical and mathemati...
Summary. It has been observed for a long time that radiation effects can prevent the development of ...
AbstractA new shock filter model designed to sharpen numerically diffused discontinuities in a conse...
International audienceFollowing the pointwise semigroup approach of [ZH, MZ.1], we establish sharp p...
We study one class of nonlinear fluid dynamic models with impulse source terms. The model consists o...
We first review a general formulation of ray theory and write down the conservation forms of the equ...
AbstractSignal enhancement and restoration is one of the fields that make extensive use of PDE theor...
AbstractIn Part I of this paper, we proposed a well-posed generalized model for signal enhancement a...
AbstractThis paper concerns shock reflection for a system of hyperbolic balance laws in one space di...
In dilation or erosion processes, a shock filter is widely used in signal enhancing or image deburri...
AbstractFor a quasilinear hyperbolic system, we use the method of vanishing viscosity to construct s...
While shock filters are popular morphological image enhancement methods, no well-posedness theory is...
For the structure of a sonic boom produced by a simple aerofoil at it large distance from its source...
Abstract. For a quasilinear hyperbolic system, we use the method of vanishing viscosity to construct...
In this article we study the existence of shock wave solutions for systems of partial differential e...
This thesis consists of an introduction and five papers concerning different numerical and mathemati...
Summary. It has been observed for a long time that radiation effects can prevent the development of ...
AbstractA new shock filter model designed to sharpen numerically diffused discontinuities in a conse...
International audienceFollowing the pointwise semigroup approach of [ZH, MZ.1], we establish sharp p...
We study one class of nonlinear fluid dynamic models with impulse source terms. The model consists o...
We first review a general formulation of ray theory and write down the conservation forms of the equ...