We study fragmentation equations with power-law fragmentation rates and polynomial daughter fragments distribution function $p(s)$. The corresponding selfsimillar solutions are analysed and their exponentially decaying asymptotic behaviour and $C^{\infty }$ regularity deduced. Stability of selfsimilar solutions (under smooth exponentially decaying perturbations), with sharp exponential decay rates in time are proved, as well as $C^{\infty }$ regularity of solutions for $t>0$. The results are based on explicit expansion in terms of generalized Laguerre polynomials and the analysis of such expansions. For perturbations with power-law decay at infinity stability is also proved. Finally, we consider real analytic $p(s)$
International audienceWe consider the growth-fragmentation equation and we address the problem of fi...
We investigate an infinite, linear system of ordinary differential equations that models the evoluti...
We consider the behaviour of solutions to the continuous constant-rate coagulation-fragmentation equ...
International audienceWe are interested in the long-time asymptotic behavior of growth-fragmentation...
Fragmentation and growth-fragmentation equations is a family of problems with varied and wide applic...
The subject of this paper is a fragmentation equation with non-conservative solutions, some mass bei...
International audienceWe consider the linear growth and fragmentation equation with general coeffici...
International audienceFragmentation and growth-fragmentation equations is a family of problems with ...
We introduce three models of fragmentation in which the largest fragment in the system can be broken...
AbstractWe consider a classical integro-differential equation that arises in various applications as...
We look at models of fragmentation with growth. In such a model, one has a number of independent cel...
AbstractWe study the asymptotic behavior of linear evolution equations of the type ∂tg=Dg+Lg−λg, whe...
In this paper, we provide a systematic way of finding explicit solutions for a class of continuous f...
International audienceWe are concerned with the long-time behavior of the growth-fragmentation equat...
We study the asymptotic behavior of linear evolution equations of the type $\partial_t g = Dg + \LL ...
International audienceWe consider the growth-fragmentation equation and we address the problem of fi...
We investigate an infinite, linear system of ordinary differential equations that models the evoluti...
We consider the behaviour of solutions to the continuous constant-rate coagulation-fragmentation equ...
International audienceWe are interested in the long-time asymptotic behavior of growth-fragmentation...
Fragmentation and growth-fragmentation equations is a family of problems with varied and wide applic...
The subject of this paper is a fragmentation equation with non-conservative solutions, some mass bei...
International audienceWe consider the linear growth and fragmentation equation with general coeffici...
International audienceFragmentation and growth-fragmentation equations is a family of problems with ...
We introduce three models of fragmentation in which the largest fragment in the system can be broken...
AbstractWe consider a classical integro-differential equation that arises in various applications as...
We look at models of fragmentation with growth. In such a model, one has a number of independent cel...
AbstractWe study the asymptotic behavior of linear evolution equations of the type ∂tg=Dg+Lg−λg, whe...
In this paper, we provide a systematic way of finding explicit solutions for a class of continuous f...
International audienceWe are concerned with the long-time behavior of the growth-fragmentation equat...
We study the asymptotic behavior of linear evolution equations of the type $\partial_t g = Dg + \LL ...
International audienceWe consider the growth-fragmentation equation and we address the problem of fi...
We investigate an infinite, linear system of ordinary differential equations that models the evoluti...
We consider the behaviour of solutions to the continuous constant-rate coagulation-fragmentation equ...