Abstract: Theoretical study is presented of a special system of ordinary differential equations. The system is related to the mathematical modeling of self-oscillations of the reaction rate in a heterogeneous catalytic reaction. The periodic solutions of autonomous systems with a small parameter at the leading order derivatives are studied. We show the validity of the quasistationarity principle provided that the velocity of the reacting mixture in the reactor is high. That allows us to decrease the number of variables in the model while keeping the general model properties. A new principle of the generation of relaxation oscillations in the three-dimensional kinetic model with two fast and one slow variables is proposed.

Cite: Chumakov G.A.
Mathematical Aspects of Modeling the Self-Oscillations of the Heterogeneous Catalytic Reaction Rate. I
Siberian Mathematical Journal. 2005. V.46. N5. P.948-956. DOI: 10.1007/s11202-005-0091-1 WOS Scopus OpenAlex

Original: Чумаков Г.А.
Математические вопросы моделирования автоколебаний скорости гетерогенной каталитической реакции. I.
Сибирский математический журнал. 2005. Т.46. №5. С.1179-1189.

Dates:

Submitted:

Feb 10, 2004

Identifiers:

Web of science:	WOS:000232564500016
Scopus:	2-s2.0-26444467167
OpenAlex:	W2324308303

Citing:

DB	Citing
OpenAlex	5
Scopus	5
Web of science	4

Altmetrics: