To the problem of forming the equation system for pressure swing adsorption mathematical model

Oleg Golubyatnikov; Evgeny Akulinin; Stanislav Dvoretsky; Dmitry Dvoretsky

doi:10.1515/cppm-2021-0008

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To the problem of forming the equation system for pressure swing adsorption mathematical model

Oleg Golubyatnikov , Evgeny Akulinin , Stanislav Dvoretsky and Dmitry Dvoretsky

Published/Copyright: July 26, 2021

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From the journal Chemical Product and Process Modeling Volume 17 Issue 6

Abstract

The complexity of the pressure swing adsorption (PSA) mathematical model, the need for its multiple calculations to reach the cyclic steady state and a large number of functional dependencies lead to unstable numerical circuits, physically unrealistic oscillations in adsorption profiles, an increase in the calculation time, and the failure of the solver. The paper proposes an approach to optimizing the calculation process, which consists in finding a reasonable balance between the completeness of the PSA mathematical model and the accuracy of the results obtained. The effectiveness of the approach is demonstrated on the example of air oxygen enrichment and hydrogen recovery from synthesis gas. The gas separation processes were simulated for the two-adsorber PSA unit with a granulated 13X adsorbent. The effect of the changes in the model coefficients on its accuracy in the operating range of input variables is investigated. A distinctive feature of this study is the recommendations for choosing a set of the model equations to calculate the PSA processes which are particularly relevant when solving optimization problems with uncertainty. The productivity, cycle duration, the diameter of the adsorbent particles and the flow rate, at which it is advisable to use the isothermal and external diffusion reduced PSA model in the calculations, are established, which will save at least 24.3 and 47.1% of the CPU time with a small loss in accuracy. The proposed approach can be used to form a set of equations for the PSA, rPSA, ultra rPSA, VSA, VPSA models, separation of various gas mixtures on various adsorbents.

Keywords: hydrogen; mathematical modeling; numerical study; oxygen; pressure swing adsorption; sensitivity

Corresponding author: Oleg Golubyatnikov, Tambov State Technical University, Sovetskaya Str., 106, 392000 Tambov, Russia, E-mail: golubyatnikov_ol@mail.ru

Funding source: Ministry of Science and Higher Education of the Russian Federation

Award Identifier / Grant number: President Grant MK-1604.2020.8

Funding source: Ministry of Science and Higher Education of the Russian Federation

Author contributions: All the authors have accepted responsibility for the entire content of this submitted manuscript and approved submission.
Research funding: This research was supported by the Ministry of Science and Higher Education of the Russian Federation within the President Grant MK-1604.2020.8.
Conflict of interest statement: The authors declare no conflicts of interest regarding this article.

Appendix

Table 8:

Values of adsorbent characteristics and gas mixture in the PSA model.

Initial data	Air	Synthesis gas
Zeolite adsorbent	13X	13X
Density of the adsorbent, ρ_a (kg/m³)	2140	2140
Porosity coefficient of the adsorbent, ε (m³/m³)	0.39	0.39
Thermal conductivity coefficient of the adsorbent, λ_a (W/m K)	0.139	0.139
Sphericity coefficient of adsorbent particles, ψ	1	1
Specific heat of the adsorbent, C_a (J/kg K)	830	830
Input temperature in the adsorbent, Tain (°C)	25	25
Characteristic energy of adsorption, E (J/mol)	12902	12902
Average lifetime of an adsorbate molecule in the adsorbate state, τ₀ (s)	10^–13	10^–13
Relative volume of adsorbent macropores, εmacro (m³/m³)	0.7	0.7
Relative volume of adsorbent micropores, εmicro (m³/m³)	0.25	0.25
Component concentration, c (vol %)	22/78 (O₂/N₂)	68/27/5 (H₂/CO₂/CO)
Temperature of gas mixture, Tgin (°C)	25	25
Latent heat of vaporization, γ (J/mol)	6819.9/5577.3 (O₂/N₂)	903.7/17154.4/6041.7 (H₂/CO₂/CO)
Diffusion volume, V	16.6/17.9 (O₂/N₂)	7.07/26.9/18.9 (H₂/CO₂/CO)

Table 9:

Parameters of the Dubinin–Radushkevich isotherm.

Initial data	Air	Synthesis gas
Limiting adsorption volume, W₀ (cm³/g)	0.262	0.262
Parameter of the dominant micropore size, B (10⁻⁶ 1/K²)	2.2	2.2
Affinity coefficient, φ	0.65/1 (O₂/N₂)	0.15/2.2/1.05 (H₂/CO₂/CO)
Critical molar volume, v∗ (cm³/mmol)	0.04/0.06 (O₂/N₂)	0.007/0.04/0.05 (H₂/CO₂/CO)
Thermal coefficient of limiting adsorption, α* (10⁻³)	1.7861/2.1753 (O₂/N₂)	5.1448/2.626/1.7372 (H₂/CO₂/CO)
Saturation pressure, P_s (atm)	498.08/525.99 (O₂/N₂)	620.78/212.49/343.99 (H₂/CO₂/CO)

Table 10:

Adsorber design and mode parameters of PSA processes.

Initial data	Air	Synthesis gas
Inner diameter of the adsorber, D (m)	0.04	0.1
Adsorbent bed length, L (m)	0.2	1.0
Desorption input pressure, Pdesin (atm)	1	0.75

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Received: 2021-01-27

Accepted: 2021-07-12

Published Online: 2021-07-26

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Articles in the same Issue

https://doi.org/10.1515/cppm-2021-0008

Keywords for this article

hydrogen; mathematical modeling; numerical study; oxygen; pressure swing adsorption; sensitivity