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Approximate Moment Methods for Population Balance Equations in Particulate and Bioengineering Processes

Robert Dürr, Andreas Bück

2020Processes24 citationsDOIOpen Access PDF

Abstract

Population balance modeling is an established framework to describe the dynamics of particle populations in disperse phase systems found in a broad field of industrial, civil, and medical applications. The resulting population balance equations account for the dynamics of the number density distribution functions and represent (systems of) partial differential equations which require sophisticated numerical solution techniques due to the general lack of analytical solutions. A specific class of solution algorithms, so-called moment methods, is based on the reduction of complex models to a set of ordinary differential equations characterizing dynamics of integral quantities of the number density distribution function. However, in general, a closed set of moment equations is not found and one has to rely on approximate closure methods. In this contribution, a concise overview of the most prominent approximate moment methods is given.

Topics & Concepts

Moment (physics)Ordinary differential equationMoment closureApplied mathematicsPopulationPopulation balance equationPartial differential equationMathematicsDifferential equationClosure (psychology)Field (mathematics)Statistical physicsMathematical optimizationMathematical analysisClassical mechanicsPhysicsMechanicsTurbulenceDemographyMarket economyPure mathematicsSociologyEconomicsCoagulation and Flocculation StudiesParticle Dynamics in Fluid FlowsCyclone Separators and Fluid Dynamics