Multiscale supercomputer modeling of gas purification processes by the adsorption method

Authors

DOI:

https://doi.org/10.26089/NumMet.v21r106

Keywords:

multiscale supercomputer modeling, gas purification by adsorption, high-performance computing

Abstract

This paper considers the problem of supercomputer modeling of processes for cleaning the air from fine-dispersed solid polluting impurities clustered in the form of nanoparticles. The simulated purification method involves the use of nanofilters and sorbents. Both the purification methods are often combined in modern treatment systems. The cleaning method using nanofilters allows one to obtain the high quality of purification, but is expensive due to the need for frequent replacement of filter elements (membranes). The cleaning method using sorbents is somewhat worse in quality, however, it allows cleaning many times after washing the sorbent with special liquids. To optimize air cleaning systems using nanofilters and sorbents, a detailed study of the processes occurring in the cleaning system is necessary. The proposed study considers part of the problem associated with the passage of an air stream containing solid pollutant nanoparticles through a layer of granular sorbent. To accomplish this, a multiscale mathematical model, a numerical algorithm and a parallel implementation of the model on a macroscopic scale have been developed. The novelty of the approach is associated with the use of a quasigasdynamic model to describe the flow in the sorbing layer and several variants of the boundary conditions on the sorbent granules. Preliminary calculations show the possibility of calculating flows of a similar class.

Author Biographies

S.V. Polyakov

Yu.N. Karamzin

T.A. Kudryashova

V.O. Podryga

D.V. Puzyrkov

N.I. Tarasov

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Published

13-02-2020

How to Cite

Поляков С., Карамзин Ю., Кудряшова Т., Подрыга В., Пузырьков Д., Тарасов Н. Multiscale Supercomputer Modeling of Gas Purification Processes by the Adsorption Method // Numerical Methods and Programming (Vychislitel’nye Metody i Programmirovanie). 2020. 21. 64-77. doi 10.26089/NumMet.v21r106

Issue

Section

Section 1. Numerical methods and applications