AbstractWe discuss here a systematic approach towards a positive answer to Hilbert′s 16th problem for quadratic systems, namely the existence of a uniform bound for the number of limit cycles of a quadratic system. The method is the following: describe the limit periodic sets surrounding the origin in a family of quadratic vector fields and prove that they have finite cyclicity. In this paper we give the list of all graphics and degenerate graphics that should be considered and describe their general features. We also indicate how to find or where to find concrete examples of these limit periodic sets
AbstractFor a one parameter family of plane quadratic vector fields X(.,ε) depending analytically on...
Since Hilbert posed the problem of systematically counting and locating lhe limit cycle of polynomia...
Recent work links certain aspects of the second part of Hilbertâ s 16th problem (H16) to the theory...
In this paper we make essential steps in proving the finite cyclicity of degenerate graphics in quad...
International audienceThis article uses analytic geometry methods to bound the number of limit cycle...
AbstractIn this paper we introduce the notion of infinity strip and strip of hyperbolas as organizin...
AbstractIn the paper we find a set of necessary conditions that must be satisfied by a quadratic sys...
AbstractYablonskii (Differential Equations 2 (1996) 335) and Filipstov (Differential Equations 9 (19...
We apply the averaging method in a class of planar systems given by a linear center perturbed by a s...
We study the number of limit cycles bifurcating from a piecewise quadratic system. All the different...
AbstractIn this paper a class of quadratic systems is studied. By quadratic systems we mean autonomo...
AbstractIn this paper we consider real quadratic systems. We present new criteria for the existence ...
AbstractGiven a quadratic system (QS) with a focus or a center at the origin we write it in the form...
Over the past two decades the theory of limit cycles, especially for quadratic differential systems,...
In this thesis, we discuss a new approach to the Hilbert 16th problem via computer assisted analysis...
AbstractFor a one parameter family of plane quadratic vector fields X(.,ε) depending analytically on...
Since Hilbert posed the problem of systematically counting and locating lhe limit cycle of polynomia...
Recent work links certain aspects of the second part of Hilbertâ s 16th problem (H16) to the theory...
In this paper we make essential steps in proving the finite cyclicity of degenerate graphics in quad...
International audienceThis article uses analytic geometry methods to bound the number of limit cycle...
AbstractIn this paper we introduce the notion of infinity strip and strip of hyperbolas as organizin...
AbstractIn the paper we find a set of necessary conditions that must be satisfied by a quadratic sys...
AbstractYablonskii (Differential Equations 2 (1996) 335) and Filipstov (Differential Equations 9 (19...
We apply the averaging method in a class of planar systems given by a linear center perturbed by a s...
We study the number of limit cycles bifurcating from a piecewise quadratic system. All the different...
AbstractIn this paper a class of quadratic systems is studied. By quadratic systems we mean autonomo...
AbstractIn this paper we consider real quadratic systems. We present new criteria for the existence ...
AbstractGiven a quadratic system (QS) with a focus or a center at the origin we write it in the form...
Over the past two decades the theory of limit cycles, especially for quadratic differential systems,...
In this thesis, we discuss a new approach to the Hilbert 16th problem via computer assisted analysis...
AbstractFor a one parameter family of plane quadratic vector fields X(.,ε) depending analytically on...
Since Hilbert posed the problem of systematically counting and locating lhe limit cycle of polynomia...
Recent work links certain aspects of the second part of Hilbertâ s 16th problem (H16) to the theory...