The multi-dimensional coagulation-fragmentation model with unbounded kernel
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Publication:6612681
DOI10.24193/fpt-ro.2024.2.08MaRDI QIDQ6612681
Jogendra Kumar, Jomon Aliyas Paul, Debarun Ghosh, Jyun-Cheng Yao
Publication date: 1 October 2024
Published in: Fixed Point Theory (Search for Journal in Brave)
existencecontractionfixed pointcoagulationfragmentationvolume conservationmulti-dimensionpopulation balance model
Integro-ordinary differential equations (45J05) Nonlinear ordinary differential equations and systems (34A34) Fixed-point theorems (47H10)
Cites Work
- Large time asymptotics for a modified coagulation model
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- Accurate and efficient approximations for generalized population balances incorporating coagulation and fragmentation
- Uniqueness of solutions to the coagulation-fragmentation equation with singular kernel
- Existence and uniqueness of steady-state solution to a singular coagulation-fragmentation equation
- The singular coagulation equation with multiple fragmentation
- Local well posedness for a linear coagulation equation
- Exponential trend to equilibrium for discrete coagulation equations with strong fragmentation and without a balance condition
- Rate of Convergence to Self-Similarity for Smoluchowski's Coagulation Equation with Constant Coefficients
- On the approximate solutions of fragmentation equations
- An existence‐uniqueness result for the pure binary collisional breakage equation
- Clustering in coagulation-fragmentation processes, random combinatorial structures and additive number systems: Asymptotic formulae and limiting laws
- Accurate and efficient flux-corrected finite volume approximation for the fragmentation problem
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