We make use of Laplace transform techniques and the method of characteristics to solve fragmentation equations explicitly. Our result is a breakthrough in the analysis of pure fragmentation equations as this is the first instance where an exact solution is provided for the fragmentation evolution equation with general fragmentation rates. This paper is the key for resolving most of the open problems in fragmentation theory including “shattering” and the sudden appearance of infinitely many particles in some systems with initial finite particles number
Original research on the theory and application of evolution equations to stochastics, physics, engi...
A linear rate equation describes fragmentation with continuous and discrete mass loss typified by co...
We consider a linear rate equation, depending on three parameters, that model fragmentation. For ea...
A new general class of exact, explicit scaling solutions to the fragmentation equation is given. Thi...
Exact and asymptotic solutions to a linear rate equation for fragmentation with mass loss are prese...
We examine an infinite, linear system of ordinary differential equations that models the evolution o...
The subject of this paper is a fragmentation equation with non-conservative solutions, some mass bei...
This work is focused on developing a finite volume scheme for approximating a fragmentation equation...
Abstract. The discrete binary fragmentation equation is solved explicitly far a model where tnenetra...
International audienceExistence of mass-conserving weak solutions to the coagulation-fragmentation e...
Explicit solutions of a linear rate equation lead to an improved understanding of fragmentation wit...
International audienceWe consider the fragmentation equation $\dfrac{\partial}{\partial t}f (t, x) =...
In this paper, we provide a systematic way of finding explicit solutions for a class of continuous f...
Most theoretical kinetic approaches proposed so far to describe fragmentation processes rely on the ...
Jury : M. Jean BERTOIN (Directeur de thèse) M. Quansheng LIU (Rapporteur) Mme. Sylvie MELEARD M. Ala...
Original research on the theory and application of evolution equations to stochastics, physics, engi...
A linear rate equation describes fragmentation with continuous and discrete mass loss typified by co...
We consider a linear rate equation, depending on three parameters, that model fragmentation. For ea...
A new general class of exact, explicit scaling solutions to the fragmentation equation is given. Thi...
Exact and asymptotic solutions to a linear rate equation for fragmentation with mass loss are prese...
We examine an infinite, linear system of ordinary differential equations that models the evolution o...
The subject of this paper is a fragmentation equation with non-conservative solutions, some mass bei...
This work is focused on developing a finite volume scheme for approximating a fragmentation equation...
Abstract. The discrete binary fragmentation equation is solved explicitly far a model where tnenetra...
International audienceExistence of mass-conserving weak solutions to the coagulation-fragmentation e...
Explicit solutions of a linear rate equation lead to an improved understanding of fragmentation wit...
International audienceWe consider the fragmentation equation $\dfrac{\partial}{\partial t}f (t, x) =...
In this paper, we provide a systematic way of finding explicit solutions for a class of continuous f...
Most theoretical kinetic approaches proposed so far to describe fragmentation processes rely on the ...
Jury : M. Jean BERTOIN (Directeur de thèse) M. Quansheng LIU (Rapporteur) Mme. Sylvie MELEARD M. Ala...
Original research on the theory and application of evolution equations to stochastics, physics, engi...
A linear rate equation describes fragmentation with continuous and discrete mass loss typified by co...
We consider a linear rate equation, depending on three parameters, that model fragmentation. For ea...