A formula for the post-gelation mass of a coagulation equation with a separable bilinear kernel
From MaRDI portal
Publication:852890
DOI10.1016/j.physd.2006.08.003zbMath1129.82029OpenAlexW2057421924MaRDI QIDQ852890
Mazi Shirvani, Henry J. van Roessel
Publication date: 15 November 2006
Published in: Physica D (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.physd.2006.08.003
Integro-partial differential equations (45K05) Interacting particle systems in time-dependent statistical mechanics (82C22)
Related Items
An introduction to mathematical models of coagulation--fragmentation processes: a discrete deterministic mean-field approach, Uniqueness of post-gelation solutions of a class of coagulation equations, Exact solution of a coagulation equation with a product kernel in the multicomponent case, A Framework for Exploring the Post-gelation Behavior of Ziff and Stell's Polymerization Models
Cites Work
- Unnamed Item
- On the coagulation-fragmentation equation
- Convergence to equilibrium in a system of reacting polymers
- A Scalar Transport Equation
- Solutions and critical times for the polydisperse coagulation equation when a(x,y)=A+B(x+y)+Cxy
- Singularities in the kinetics of coagulation processes
- On the Scalar Transport Equation
- What is the Laplace Transform?
- Some results on the coagulation equation
