{"title":"Differential Equations with a Small Parameter\nand Multipeak Oscillations","authors":"G. A. Chumakov, N. A. Chumakova","doi":"10.1134/S1990478924010034","DOIUrl":null,"url":null,"abstract":"<p> In this paper, we study a nonlinear dynamical system of autonomous ordinary differential\nequations with a small parameter\n<span>\\( \\mu \\)</span> such that two variables\n<span>\\( x \\)</span> and\n<span>\\( y \\)</span> are fast and another one\n<span>\\( z \\)</span> is slow. If we take the limit as\n<span>\\( \\mu \\to 0 \\)</span>, then this becomes a “<i>degenerate\nsystem</i>” included in the one-parameter family of two-dimensional subsystems of\n<i>fast motions</i> with the parameter\n<span>\\( z \\)</span> in some interval. It is assumed that in each subsystem there exists\na <i>structurally stable</i> limit cycle\n<span>\\( l_z \\)</span>. In addition, in the <i>complete</i>\ndynamical system there is some structurally stable periodic orbit\n<span>\\( L \\)</span> that tends to a limit cycle\n<span>\\( l_{z_0} \\)</span> for some\n<span>\\( z=z_0 \\)</span> as\n<span>\\( \\mu \\)</span> tends to zero. We can define the first return map, or the Poincaré\nmap, on a local cross section in the hyperplane\n<span>\\( (y,z) \\)</span> orthogonal to\n<span>\\( L \\)</span> at some point. We prove that the Poincaré map has an invariant\nmanifold for the fixed point corresponding to the periodic orbit\n<span>\\( L \\)</span> on a guaranteed interval over the variable\n<span>\\( y \\)</span>, and the interval length is separated from zero as\n<span>\\( \\mu \\)</span> tends to zero. The proved theorem allows one to formulate some sufficient\nconditions for the existence and/or absence of multipeak oscillations in the complete dynamical\nsystem. As an example of application of the obtained results, we consider some kinetic model of\nthe catalytic reaction of hydrogen oxidation on nickel.\n</p>","PeriodicalId":607,"journal":{"name":"Journal of Applied and Industrial Mathematics","volume":"18 1","pages":"18 - 35"},"PeriodicalIF":0.5800,"publicationDate":"2024-04-26","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"0","resultStr":null,"platform":"Semanticscholar","paperid":null,"PeriodicalName":"Journal of Applied and Industrial Mathematics","FirstCategoryId":"1085","ListUrlMain":"https://link.springer.com/article/10.1134/S1990478924010034","RegionNum":0,"RegionCategory":null,"ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"Q3","JCRName":"Engineering","Score":null,"Total":0}
引用次数: 0
Abstract
In this paper, we study a nonlinear dynamical system of autonomous ordinary differential
equations with a small parameter
\( \mu \) such that two variables
\( x \) and
\( y \) are fast and another one
\( z \) is slow. If we take the limit as
\( \mu \to 0 \), then this becomes a “degenerate
system” included in the one-parameter family of two-dimensional subsystems of
fast motions with the parameter
\( z \) in some interval. It is assumed that in each subsystem there exists
a structurally stable limit cycle
\( l_z \). In addition, in the complete
dynamical system there is some structurally stable periodic orbit
\( L \) that tends to a limit cycle
\( l_{z_0} \) for some
\( z=z_0 \) as
\( \mu \) tends to zero. We can define the first return map, or the Poincaré
map, on a local cross section in the hyperplane
\( (y,z) \) orthogonal to
\( L \) at some point. We prove that the Poincaré map has an invariant
manifold for the fixed point corresponding to the periodic orbit
\( L \) on a guaranteed interval over the variable
\( y \), and the interval length is separated from zero as
\( \mu \) tends to zero. The proved theorem allows one to formulate some sufficient
conditions for the existence and/or absence of multipeak oscillations in the complete dynamical
system. As an example of application of the obtained results, we consider some kinetic model of
the catalytic reaction of hydrogen oxidation on nickel.
期刊介绍:
Journal of Applied and Industrial Mathematics is a journal that publishes original and review articles containing theoretical results and those of interest for applications in various branches of industry. The journal topics include the qualitative theory of differential equations in application to mechanics, physics, chemistry, biology, technical and natural processes; mathematical modeling in mechanics, physics, engineering, chemistry, biology, ecology, medicine, etc.; control theory; discrete optimization; discrete structures and extremum problems; combinatorics; control and reliability of discrete circuits; mathematical programming; mathematical models and methods for making optimal decisions; models of theory of scheduling, location and replacement of equipment; modeling the control processes; development and analysis of algorithms; synthesis and complexity of control systems; automata theory; graph theory; game theory and its applications; coding theory; scheduling theory; and theory of circuits.
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