The problem of the uniqueness of limit cycles for Liénard systems is investigated in connection with the properties of the function F(x). When α and β (α < 0 < β) are the unique nontrivial solutions of the equation F(x) = 0, necessary and sufficient conditions in order that all the possible limit cycles of the system intersect the lines x = α and x = β are given. Therefore, in view of classical results, the limit cycle is unique. Some examples are presented to show the applicability of our results in situations with lack of symmetry
We continue the recent investigation [40] about the qualitative properties of the solutions for a cl...
AbstractIn this paper we study the limit cycles of the Liénard differential system of the form x¨+f(...
Abstract. We further generalize a recent improvement obtained by G. Villari of the classical Massera...
The problem of the uniqueness of limit cycles for Liénard systems is investigated in connection with...
AbstractWe consider the Liénard equation and we give a sufficient condition to ensure existence and ...
AbstractIn this paper, we consider a generalized Liénard systemdxdt=ϕ(y)−F(x),(0.1)dydt=−g(x), where...
The problem of uniqueness of limit cycles for the Li\ue9nard equation \u1e8d+f(x)\u1e8b+g(x)=0 is in...
Kooij and Sun (J Math Anal Appl 208:260-276, 1997) proposed a theorem to guarantee the uniqueness of...
AbstractIn this paper, conditions that guarantee the uniqueness of limit cycles in the Liénard-type ...
AbstractWe shall give two criteria for the uniqueness of limit cycles of systems of Liénard type ẋ ...
AbstractIn monographs [Theory of Limit Cycles, 1984] and [Qualitative Theory of Differential Equatio...
We give an account of the results about limit cycle’s uniqueness for Liénard equations, starting fro...
AbstractIn this paper, we use the theory of generalized rotated fields to prove a theorem of the uni...
In this paper we study the non-existence and the uniqueness of limit cycles for the Liénard differen...
Abstract5proposed a theorem to guarantee the uniqueness of limit cycles for the generalized Liénard ...
We continue the recent investigation [40] about the qualitative properties of the solutions for a cl...
AbstractIn this paper we study the limit cycles of the Liénard differential system of the form x¨+f(...
Abstract. We further generalize a recent improvement obtained by G. Villari of the classical Massera...
The problem of the uniqueness of limit cycles for Liénard systems is investigated in connection with...
AbstractWe consider the Liénard equation and we give a sufficient condition to ensure existence and ...
AbstractIn this paper, we consider a generalized Liénard systemdxdt=ϕ(y)−F(x),(0.1)dydt=−g(x), where...
The problem of uniqueness of limit cycles for the Li\ue9nard equation \u1e8d+f(x)\u1e8b+g(x)=0 is in...
Kooij and Sun (J Math Anal Appl 208:260-276, 1997) proposed a theorem to guarantee the uniqueness of...
AbstractIn this paper, conditions that guarantee the uniqueness of limit cycles in the Liénard-type ...
AbstractWe shall give two criteria for the uniqueness of limit cycles of systems of Liénard type ẋ ...
AbstractIn monographs [Theory of Limit Cycles, 1984] and [Qualitative Theory of Differential Equatio...
We give an account of the results about limit cycle’s uniqueness for Liénard equations, starting fro...
AbstractIn this paper, we use the theory of generalized rotated fields to prove a theorem of the uni...
In this paper we study the non-existence and the uniqueness of limit cycles for the Liénard differen...
Abstract5proposed a theorem to guarantee the uniqueness of limit cycles for the generalized Liénard ...
We continue the recent investigation [40] about the qualitative properties of the solutions for a cl...
AbstractIn this paper we study the limit cycles of the Liénard differential system of the form x¨+f(...
Abstract. We further generalize a recent improvement obtained by G. Villari of the classical Massera...