We consider the family of polynomial differential systems $$\displaylines{ x' = x+( \alpha y-\beta x) (ax^2-bxy+ay^2) ^{n}, \cr y' = y-( \beta y+\alpha x) (ax^2-bxy+ay^2) ^{n}, }$$ where a, b, $\alpha $, $\beta $ are real constants and n is positive integer. We prove that these systems are Liouville integrable. Moreover, we determine sufficient conditions for the existence of an explicit algebraic or non-algebraic limit cycle. Examples exhibiting the applicability of our result are introduced
In the work by Gine and Grau [11], a planar differential system of degree nine admitting a nested ...
AbstractWe consider a system of the form x˙=Pn(x,y)+xRm(x,y), y˙=Qn(x,y)+yRm(x,y), where Pn(x,y), Qn...
In the qualitative study of a differential system it is important to know its limit cycles and their...
Agraïments/Ajudes: The second author is partially supported by the Algerian Ministry of Higher Educa...
AbstractWe consider the class of polynomial differential equations x˙=λx-y+Pn(x,y),y˙=x+λy+Qn(x,y), ...
In the qualitative theory of differential equations in the plane one of the most difficult objects t...
In this paper we study the limit cycles of the planar polynomial differential systems * x=ax-y P_n(x...
This paper is devoted to study the algebraic limit cycles of planar piecewise linear differential sy...
For a given algebraic curve of degree $n$, we exhibit differential systems of degree greater than or...
Algebraic limit cycles in quadratic polynomial differential systems started to be studied in 1958, a...
AbstractIn the paper we find a set of necessary conditions that must be satisfied by a quadratic sys...
International audienceWe consider a system of the form x'=P_n(x,y)+xR_m(x,y), y'=Q_n(x,y)+yR_m(x,y),...
Agraïments: The second author has been supported by the grant AGAUR PIV-DGR-2010 and by FCT through ...
We prove that the generalized Liénard polynomial differential system x'=y^2p-1, y'=-x^2q-1 - f(x) y^...
In this paper we study the existence and non-existence of limit cycles for the class of polynomial d...
In the work by Gine and Grau [11], a planar differential system of degree nine admitting a nested ...
AbstractWe consider a system of the form x˙=Pn(x,y)+xRm(x,y), y˙=Qn(x,y)+yRm(x,y), where Pn(x,y), Qn...
In the qualitative study of a differential system it is important to know its limit cycles and their...
Agraïments/Ajudes: The second author is partially supported by the Algerian Ministry of Higher Educa...
AbstractWe consider the class of polynomial differential equations x˙=λx-y+Pn(x,y),y˙=x+λy+Qn(x,y), ...
In the qualitative theory of differential equations in the plane one of the most difficult objects t...
In this paper we study the limit cycles of the planar polynomial differential systems * x=ax-y P_n(x...
This paper is devoted to study the algebraic limit cycles of planar piecewise linear differential sy...
For a given algebraic curve of degree $n$, we exhibit differential systems of degree greater than or...
Algebraic limit cycles in quadratic polynomial differential systems started to be studied in 1958, a...
AbstractIn the paper we find a set of necessary conditions that must be satisfied by a quadratic sys...
International audienceWe consider a system of the form x'=P_n(x,y)+xR_m(x,y), y'=Q_n(x,y)+yR_m(x,y),...
Agraïments: The second author has been supported by the grant AGAUR PIV-DGR-2010 and by FCT through ...
We prove that the generalized Liénard polynomial differential system x'=y^2p-1, y'=-x^2q-1 - f(x) y^...
In this paper we study the existence and non-existence of limit cycles for the class of polynomial d...
In the work by Gine and Grau [11], a planar differential system of degree nine admitting a nested ...
AbstractWe consider a system of the form x˙=Pn(x,y)+xRm(x,y), y˙=Qn(x,y)+yRm(x,y), where Pn(x,y), Qn...
In the qualitative study of a differential system it is important to know its limit cycles and their...