scholarly journals Dulac – Cherkas functions for systems equivalent to the van der Pol equation

2020 ◽  
Vol 56 (3) ◽  
pp. 275-286
Author(s):  
A. A. Hryn
Keyword(s):  
Limit Cycle ◽  
Phase Plane ◽  
Algebraic Curves ◽  
Real Parameter ◽  
Real Plane ◽  
Singularly Perturbed Systems ◽  
Van Der Pol ◽  
The Subject ◽  
Equivalent Systems ◽  
Parameter Values

The object of this study is an autonomous van der Pol system on a real plane. The subject of the study is the properties of the limit cycle of this system. The main purpose of this paper is to find the localization of the limit cycle on the phase plane and establish its shape for various values of the real parameter of the van der Pol system. Our approach is based on the use of transverse curves related to the Dulac – Cherkas functions and approximating the location of the limit cycle. As the first step, five topologically equivalent systems, including systems with a parameter rotating the vector field, as well as singularly perturbed systems are determined for the van der Pol system. Then, applying the previously elaborated method, we constructed two polynomial Dulac – Cherkas functions for each of three systems from the considered ones in the phase plane for all real nonzero values of the parameter. Using them, transverse curves forming the boundaries of the localization regions of the limit cycle for the van der Pol system are found. Thus, the constructed Dulac – Cherkas functions allow us to determine the location of the limit cycle on the basis of algebraic curves for all real parameter values, including values close to the bifurcation of a limit cycle from the center ovals, the Andronov – Hopf bifurcation, and the bifurcation from a closed trajectory related to a discontinuous periodic solution.

scholarly journals Asymptotic Limit-cycle Analysis of Oscillating Chemical Reactions

2021 ◽  
Author(s):  
Alain Brizard ◽  
Samuel Berry
Keyword(s):  
Limit Cycle ◽  
Chemical Reactions ◽  
Relaxation Oscillation ◽  
Three Dimensional ◽  
Van Der Pol Oscillator ◽  
Asymptotic Limit ◽  
Two Dimensional ◽  
Van Der Pol ◽  
Parameter Values ◽  
Analytical Expressions

Abstract The asymptotic limit-cycle analysis of mathematical models for oscillating chemical reactions is presented. In this work, after a brief presentation of mathematical preliminaries applied to the biased Van der Pol oscillator, we consider a two-dimensional model of the Chlorine dioxide Iodine Malonic-Acid (CIMA) reactions and the three-dimensional and two-dimensional Oregonator models of the Belousov-Zhabotinsky (BZ) reactions. Explicit analytical expressions are given for the relaxation-oscillation periods of these chemical reactions that are accurate within 5% of their numerical values. In the two-dimensional CIMA and Oregonator models, we also derive critical parameter values leading to canard explosions and implosions in their associated limit cycles.

scholarly journals Real plane algebraic curves with prescribed singularities

Topology ◽  
1993 ◽  
Vol 32 (4) ◽  
pp. 845-856 ◽  
Author(s):  
Eugenii Shustin
Keyword(s):  
Algebraic Curves ◽  
Real Plane

Amplitude control of a limit cycle in a coupled van der Pol system

2009 ◽  
Vol 71 (7-8) ◽  
pp. 2491-2496 ◽  
Author(s):  
Jiashi Tang ◽  
Feng Han ◽  
Han Xiao ◽  
Xiao Wu
Keyword(s):  
Limit Cycle ◽  
Van Der Pol ◽  
Amplitude Control

scholarly journals Recovery of inclusion separations in strongly heterogeneous composites from effective property measurements

2011 ◽  
Vol 468 (2139) ◽  
pp. 784-809 ◽  
Author(s):  
Chris Orum ◽  
Elena Cherkaev ◽  
Kenneth M. Golden
Keyword(s):  
Inverse Spectral Problem ◽  
Algebraic Curves ◽  
Volume Fraction ◽  
Adjoint Operator ◽  
Effective Property ◽  
Host Matrix ◽  
Separation Parameter ◽  
Property Data ◽  
Transformation Structure ◽  
Parameter Values

An effective property of a composite material consisting of inclusions within a host matrix depends on the geometry and connectedness of the inclusions. This dependence may be quite strong if the constituents have highly contrasting properties. Here, we consider the inverse problem of using effective property data to obtain information on the geometry of the microstructure. While previous work has been devoted to recovering the volume fractions of the constituents, our focus is on their connectedness—a key feature in critical behaviour and phase transitions. We solve exactly a reduced inverse spectral problem by bounding the volume fraction of the constituents, an inclusion separation parameter and the spectral gap of a self-adjoint operator that depends on the geometry of the composite. We present a new algorithm based on the Möbius transformation structure of the forward bounds whose output is a set of algebraic curves in parameter space bounding regions of admissible parameter values. These results advance the development of techniques for characterizing the microstructure of composite materials. As an example, we obtain inverse bounds on the volume fraction and separation of the brine inclusions in sea ice from measurements of its effective complex permittivity.

PHASE MODEL REDUCTION AND PHASE LOCKING OF COUPLED NONLINEAR OSCILLATORS

2010 ◽  
Vol 20 (03) ◽  
pp. 645-656 ◽  
Author(s):  
MICHELE BONNIN ◽  
FERNANDO CORINTO ◽  
MARCO GILLI
Keyword(s):  
Applied Sciences ◽  
Phase Locking ◽  
Phase Model ◽  
Phase Variable ◽  
Van Der Pol ◽  
Periodically Driven ◽  
Analytical Approximations ◽  
Coupled Nonlinear Oscillators ◽  
Successful Approach ◽  
The Subject

The synchronization of an oscillator with an external stimulus or between coupled elements is the subject of intense research in many areas of applied sciences. The most successful approach is based on phase modeling, founded on the idea to represent each oscillator by a phase variable. Phase models have been analyzed with a wealth of details and in a plethora of different variants, but little research has been done in view of the reduction of a physical system to the corresponding phase model. In this paper we investigate the possibility, at least within the context of analytical approximations, to obtain the phase model corresponding to a given nonlinear system. Both periodically driven and coupled oscillators are considered, and examples based on Stuart–Landau and van der Pol systems are given.

scholarly journals Real Perturbation of Complex Analytic Families: Points to Regions

1998 ◽  
Vol 08 (01) ◽  
pp. 73-93 ◽  
Author(s):  
Bruce B. Peckham
Keyword(s):  
Numerical Study ◽  
Sufficient Conditions ◽  
Real Parameter ◽  
Complex Parameter ◽  
Mandelbrot Set ◽  
Complex Conjugate ◽  
Real Plane ◽  
Phase Variable ◽  
Bifurcation Points ◽  
Quadratic Family

This study provides some connections between bifurcations of one-complex-parameter complex analytic families of maps of the complex plane C and bifurcations of more general two-real-parameter families of real analytic (or Ck or C∞) maps of the real plane ℛ2. We perform a numerical study of local bifurcations in the families of maps of the plane given by [Formula: see text] where z is a complex dynamic (phase) variable, [Formula: see text] its complex conjugate, C is a complex parameter, and α is a real parameter. For α=0, the resulting family is the familiar complex quadratic family. For α≠ 0, the map fails to be complex analytic, but is still analytic (quadratic) when viewed as a map of ℛ2. We treat α in this family as a perturbing parameter and ask how the two-parameter bifurcation diagrams in the C parameter plane change as the perturbing parameter α is varied. The most striking phenomenon that appears as α is varied is that bifurcation points in the C plane for the quadratic family (α=0) evolve into fascinating bifurcation regions in the C plane for nonzero α. Such points are the cusp of the main cardioid of the Mandelbrot set and contact points between "bulbs" of the Mandelbrot set. Arnold resonance tongues are part of the evolved scenario. We also provide sufficient conditions for more general perturbations of complex analytic maps of the plane of the form: [Formula: see text] to have bifurcation points for α=0 which evolve into nontrivial bifurcation regions as α grows from zero.

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