Share:


Identification of unknown parameters of the dynamic model of mass transfer

    Volodymyr Zavialov Affiliation
    ; Oleksii Lobok Affiliation
    ; Taras Mysiura Affiliation
    ; Nataliia Popova Affiliation
    ; Valentyn Chornyi   Affiliation
    ; Taras Pohorilyi Affiliation

Abstract

An iterative algorithm for identifying unknown parameters of a mathematical model based on the Bayesian approach is proposed, which makes it possible to determine the most probable maximum informative estimates of these parameters. The example of the mathematical model of mass transfer dynamics shows the algorithm for finding the most probable and most informative estimate of the vector of unknown parameters, and also an analysis of the sequence of the corresponding steps is given. The results of computational experiments showed a significant dependence of the results of the calculations on the choice of the initial approximation point and slowing down the rate of convergence of the iterative process (and even its divergence) with an unsuccessful choice of the initial approximation. The validity of the obtained results is provided by analytical conclusions, the results of computational experiments, and statistical modeling. The results of computational experiments make it possible to assert that the proposed algorithm has a sufficiently high convergence for a given degree of accuracy and makes it possible to derive not only estimates of point values of mathematical model parameters based on a posteriori analysis, but also confidence intervals of these estimates. At the same time, it should be noted that the results of calculations depend significantly on the choice of the initial approximation point and the slowing of the convergence rate of the iterative process with an unsuccessful choice of the initial approximation. Analytical studies and results of calculations confirm the effectiveness of the proposed identification algorithm, which makes it possible, with the help of active, purposeful experiments, to build more accurate mathematical models. In accordance with the algorithm, a program was developed in the MatLab mathematics package and computational experiments were performed.

Keyword : iterative algorithm, mass transfer, Bayesian approach, mathematical modeling, variance, experiment

How to Cite
Zavialov, V., Lobok, O., Mysiura, T., Popova, N., Chornyi, V., & Pohorilyi, T. (2023). Identification of unknown parameters of the dynamic model of mass transfer. Mathematical Modelling and Analysis, 28(3), 459–468. https://doi.org/10.3846/mma.2023.16403
Published in Issue
Sep 4, 2023
Abstract Views
246
PDF Downloads
273
Creative Commons License

This work is licensed under a Creative Commons Attribution 4.0 International License.

References

A.M. Andronov, E.A. Kopytov and L.Ya. Gringlaz. Teoriya veroyatnostey i matematicheskaya statistika. Piter, Saint Petersburg, 2004. (in Russian)

S.A. Ayvazyan and S.A. Mkhitaryan. Prikladnaya Statistika i Osnovy Ekonometriki. UNITY, Moscow, 1998. (in Russian)

G.I. Ivchenko and Yu.I. Medvedev. Vvedeniye v matematicheskuyu statistiku. Publishing house LCI, Moscow, 2010. (in Russian)

V. Zavialov, V. Bodrov, T. Misyura, N. Popova, Y. Zaporozhets and V. Dekanskiy. Development of mathematical models of external mass exchange under conditions of vibroextraction from vegetable raw materials. Chemistry & Chemical Technology, 9(3):367–374, 2015. https://doi.org/10.23939/chcht09.03.367

V. Zavialov, V. Dekanskiy, O. Lobok and T. Misyura. Matematychne modelyuvannya masoobminu pry vibroekstrahuvanni iz roslynnoyi syrovyny v umovakh kombi-novanoyi diyi mekhanichnykh kolyvan riznoyi chastoty. Scientific works of NUFT, 21(3):161–168, 2015. (in Ukrainian)

A. Zelner. Bayyesovskiye metody v ekonometrii. Statistika, Moscow, 1980. (in Russian)