To appear in Bulletin des Sciences MathématiquesInternational audienceWe study the isochronicity of centers at $O\in \mathbb{R}^2$ for systems $\dot x=-y+A(x,y),\;\dot y=x+B(x,y)$, where $A,\;B\in \mathbb{R}[x,y]$, which can be reduced to the Liénard type equation. Using the so-called C-algorithm we have found 27 new multiparameter isochronous centers
AbstractWe propose a generalization of the notion of isochronicity for real polynomial autonomous sy...
This paper is concerned with obtaining the conditions under which the origin is an isochronous centr...
In the first section we collect some unpublished results presented in [17], related to linearization...
AbstractWe study the isochronicity of centers at O∈R2 for systemsx˙=−y+A(x,y),y˙=x+B(x,y), where A,B...
AbstractWe study the isochronicity of centers at O∈R2 for systems x˙=−y+A(x,y), y˙=x+B(x,y), where A...
International audienceWe study the isochronicity of centers at $O\in \mathbb{R}^2$ for systems $$\do...
To appear in Bulletin des Sciences MathématiquesInternational audienceWe study the isochronicity of ...
International audienceWe study the isochronicity of centers at $O\in \mathbb{R}^2$ for systems $$\do...
To appear in Bulletin des Sciences MathématiquesInternational audienceWe study the isochronicity of ...
International audienceWe study the isochronicity of centers at $O\in \mathbb{R}^2$ for systems $$\do...
AbstractWe study the isochronicity of centers at O∈R2 for systemsx˙=−y+A(x,y),y˙=x+B(x,y), where A,B...
AbstractWe study the isochronicity of centers at O∈R2 for systems x˙=−y+A(x,y), y˙=x+B(x,y), where A...
For planar polynomial vector fields of the form \[ (-y X(x,y)) x (x Y(x,y)) y, \] where X and Y star...
AbstractIn this work we study isochronous centers of two-dimensional autonomous system in the plane ...
Agraïments: UNAB13-4E-1604. The second author is supported by the Slovenian Research Agency. Both au...
AbstractWe propose a generalization of the notion of isochronicity for real polynomial autonomous sy...
This paper is concerned with obtaining the conditions under which the origin is an isochronous centr...
In the first section we collect some unpublished results presented in [17], related to linearization...
AbstractWe study the isochronicity of centers at O∈R2 for systemsx˙=−y+A(x,y),y˙=x+B(x,y), where A,B...
AbstractWe study the isochronicity of centers at O∈R2 for systems x˙=−y+A(x,y), y˙=x+B(x,y), where A...
International audienceWe study the isochronicity of centers at $O\in \mathbb{R}^2$ for systems $$\do...
To appear in Bulletin des Sciences MathématiquesInternational audienceWe study the isochronicity of ...
International audienceWe study the isochronicity of centers at $O\in \mathbb{R}^2$ for systems $$\do...
To appear in Bulletin des Sciences MathématiquesInternational audienceWe study the isochronicity of ...
International audienceWe study the isochronicity of centers at $O\in \mathbb{R}^2$ for systems $$\do...
AbstractWe study the isochronicity of centers at O∈R2 for systemsx˙=−y+A(x,y),y˙=x+B(x,y), where A,B...
AbstractWe study the isochronicity of centers at O∈R2 for systems x˙=−y+A(x,y), y˙=x+B(x,y), where A...
For planar polynomial vector fields of the form \[ (-y X(x,y)) x (x Y(x,y)) y, \] where X and Y star...
AbstractIn this work we study isochronous centers of two-dimensional autonomous system in the plane ...
Agraïments: UNAB13-4E-1604. The second author is supported by the Slovenian Research Agency. Both au...
AbstractWe propose a generalization of the notion of isochronicity for real polynomial autonomous sy...
This paper is concerned with obtaining the conditions under which the origin is an isochronous centr...
In the first section we collect some unpublished results presented in [17], related to linearization...
DOI
Add to ORKG