We consider a constant coefficient coagulation equation with Becker–D¨oring type interactions and power law input of monomers J1(t)=αtω, with α > 0 and ω>−1 2 . For this infinite dimensional system we prove solutions converge to similarity profiles as t and j converge to infinity in a similarity way, namely with either j/ς or (j −ς)/√ς constants, where ς =ς(t) is a function of t only. This work generalizes to the non-autonomous case a recent result of da Costa et al. (2004). Markov Processes Relat. Fields 12, 367–398. and provides a rigorous derivation of formal results obtained by Wattis J. Phys. A: Math. Gen. 37, 7823–7841. The main part of the approach is the analysis of a bidimensional non-autonomous system obtained through an...
In this paper we prove the existence of a family of self-similar solutions for a class of coagulatio...
The Smoluchowski equations of coagulation are solved analytically in two cases involving a finite cu...
30 pagesInternational audienceWe consider in this work a model for aggregation, where the coalescing...
We consider a constant coefficient coagulation equation with Becker–D¨oring type interactions and p...
For a coagulation equation with Becker-Doring type interactions and time-independent monomer input w...
We consider a coagulation equation with constant coefficients and a time dependent power law input ...
In a recent paper, Laurencot and van Roessel (2010 J. Phys. A: Math. Theor., 43, 455210) studied the...
We establish rates of convergence of solutions to scaling (or similarity) profiles in a coagulation ...
We study the behaviour as t → ∞ of solutions (cj (t)) to the Redner–Ben-Avraham–Kahng coagulation sy...
We formulate the Becker-Döring equations for cluster growth in the presence of a time-dependent sour...
nuloWe consider a coagulation model first introduced by Redner,Ben-Avraham and Kahng in [11], the ma...
We consider a coagulation model first introduced by Redner, Ben-Avraham and Kahng in [11], the main ...
AbstractWe derive a satisfying rate of convergence of the Marcus–Lushnikov process towards the solut...
International audienceThe large time dynamics of a two species coagulation-annihilation system with ...
We study a finite-dimensional system of ordinary differential equations derived from Smoluchowski’s...
In this paper we prove the existence of a family of self-similar solutions for a class of coagulatio...
The Smoluchowski equations of coagulation are solved analytically in two cases involving a finite cu...
30 pagesInternational audienceWe consider in this work a model for aggregation, where the coalescing...
We consider a constant coefficient coagulation equation with Becker–D¨oring type interactions and p...
For a coagulation equation with Becker-Doring type interactions and time-independent monomer input w...
We consider a coagulation equation with constant coefficients and a time dependent power law input ...
In a recent paper, Laurencot and van Roessel (2010 J. Phys. A: Math. Theor., 43, 455210) studied the...
We establish rates of convergence of solutions to scaling (or similarity) profiles in a coagulation ...
We study the behaviour as t → ∞ of solutions (cj (t)) to the Redner–Ben-Avraham–Kahng coagulation sy...
We formulate the Becker-Döring equations for cluster growth in the presence of a time-dependent sour...
nuloWe consider a coagulation model first introduced by Redner,Ben-Avraham and Kahng in [11], the ma...
We consider a coagulation model first introduced by Redner, Ben-Avraham and Kahng in [11], the main ...
AbstractWe derive a satisfying rate of convergence of the Marcus–Lushnikov process towards the solut...
International audienceThe large time dynamics of a two species coagulation-annihilation system with ...
We study a finite-dimensional system of ordinary differential equations derived from Smoluchowski’s...
In this paper we prove the existence of a family of self-similar solutions for a class of coagulatio...
The Smoluchowski equations of coagulation are solved analytically in two cases involving a finite cu...
30 pagesInternational audienceWe consider in this work a model for aggregation, where the coalescing...