Accurate and efficient approximations for generalized population balances incorporating coagulation and fragmentation

DOI10.1016/j.jcp.2021.110215OpenAlexW3135098670WikidataQ114163472 ScholiaQ114163472MaRDI QIDQ2122232

Publication date: 6 April 2022

Published in: Journal of Computational Physics (Search for Journal in Brave)

Full work available at URL: https://doi.org/10.1016/j.jcp.2021.110215

zbMATH Keywords

particles coagulation fragmentation finite volume scheme cell average technique nonlinear integro-partial differential equation

Mathematics Subject Classification ID

Numerical methods for partial differential equations, initial value and time-dependent initial-boundary value problems (65Mxx) Numerical methods for integral equations, integral transforms (65Rxx) Time-dependent statistical mechanics (dynamic and nonequilibrium) (82Cxx)

Related Items (11)

New formulations and convergence analysis for reduced tracer mass fragmentation model: an application to depolymerization ⋮ Existence and uniqueness of mass conserving solutions to the coagulation and collision-induced breakage equation ⋮ Discrete finite volume formulation for multidimensional fragmentation equation and its convergence analysis ⋮ Rate of convergence of two moments consistent finite volume scheme for non-classical divergence coagulation equation ⋮ Rate of convergence and stability analysis of a modified fixed pivot technique for a fragmentation equation ⋮ Population balance equation for collisional breakage: a new numerical solution scheme and its convergence ⋮ Two moments consistent discrete formulation for binary breakage population balance equation and its convergence ⋮ Finite volume approach for fragmentation equation and its mathematical analysis ⋮ Convergence analysis of volume preserving scheme for mass based coalescence equation ⋮ On the mass conserving solutions to the singular kernel coagulation with multi-fragmentation ⋮ Challenges and opportunities concerning numerical solutions for population balances: a critical review

Cites Work

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