Instantaneous gelation in the addition model with superlinear rate coefficients is investigated. The conjectured post-gelation solution is shown to arise naturally as the limit of solutions to some finite approximations as the number of equations grows to infinity. Non-existence of continuous solutions to the addition model is also established in that case
In this thesis we study the mathematics of a model for the dynamics of cluster growth. The sizes of...
The discrete coagulation-fragmentation equations are a model for the kinetics of cluster growth in w...
AbstractWe consider an infinite system of reaction–diffusion equations that models aggregation of pa...
Instantaneous gelation in the addition model with superlinear rate coefficients is investigated. The...
We study a finite-dimensional system of ordinary differential equations derived from Smoluchowski’s...
The coagulation equations are a model for the dynamics of cluster growth in which clusters can coagu...
We study the solutions of the Smoluchowski coagulation equation with a regularization term which rem...
The exact solution (size distribution ck(t) and moments Mn(t)) of Smoluchowski's coagulation equatio...
We consider a coagulation equation with constant coefficients and a time dependent power law input ...
The coagulation (or aggregation) equation was introduced by Smoluchowski in 1916 to describe the clu...
A model for the dynamics of particles undergoing simultaneously coalescence and breakup is considere...
Smoluchowski's equation for rapid coagulation is used to describe the kinetics of gelation, in which...
The dynamics of a coagulation-fragmentation equation with multiplicative coagulation kernel and crit...
criticality in a discrete model for Smoluchowski’s equation with limited aggregations Mathieu Merle ...
AbstractA model for the dynamics of a system of particles undergoing simultaneously coalescence and ...
In this thesis we study the mathematics of a model for the dynamics of cluster growth. The sizes of...
The discrete coagulation-fragmentation equations are a model for the kinetics of cluster growth in w...
AbstractWe consider an infinite system of reaction–diffusion equations that models aggregation of pa...
Instantaneous gelation in the addition model with superlinear rate coefficients is investigated. The...
We study a finite-dimensional system of ordinary differential equations derived from Smoluchowski’s...
The coagulation equations are a model for the dynamics of cluster growth in which clusters can coagu...
We study the solutions of the Smoluchowski coagulation equation with a regularization term which rem...
The exact solution (size distribution ck(t) and moments Mn(t)) of Smoluchowski's coagulation equatio...
We consider a coagulation equation with constant coefficients and a time dependent power law input ...
The coagulation (or aggregation) equation was introduced by Smoluchowski in 1916 to describe the clu...
A model for the dynamics of particles undergoing simultaneously coalescence and breakup is considere...
Smoluchowski's equation for rapid coagulation is used to describe the kinetics of gelation, in which...
The dynamics of a coagulation-fragmentation equation with multiplicative coagulation kernel and crit...
criticality in a discrete model for Smoluchowski’s equation with limited aggregations Mathieu Merle ...
AbstractA model for the dynamics of a system of particles undergoing simultaneously coalescence and ...
In this thesis we study the mathematics of a model for the dynamics of cluster growth. The sizes of...
The discrete coagulation-fragmentation equations are a model for the kinetics of cluster growth in w...
AbstractWe consider an infinite system of reaction–diffusion equations that models aggregation of pa...
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