Add to ORKGThis article introduces an algebro-geometric setting for the space of bifurcation functions involved in the local Hilbert's 16th problem on a period annulus. Each possible bifurcation function is in one-to-one correspondence with a point in the exceptional divisor $E$ of the canonical blow-up $B_I{\C}^n$ of the Bautin ideal $I$. In this setting, the notion of essential perturbation, first proposed by Iliev, is defined via irreducible components of the Nash space of arcs $ Arc(B_I\C^n,E)$. The example of planar quadratic vector fields in the Kapteyn normal form is further discussed
Using bifurcation methods and the Abelian integral, we investigate the number of the limit cycles th...
In this work we are concerned with the problem of shape and period of isolated periodic solutions of...
Recent work links certain aspects of the second part of Hilbertâ s 16th problem (H16) to the theory...
This article introduces an algebro-geometric setting for the space of bifurcation functions involved...
International audienceAbstract This paper introduces an algebro-geometric setting for the space of b...
The original Hilbert’s 16th problem can be split into four parts consisting of Problems A{D. In this...
1. Hilbert problem as a paradigm The question on the maximal number (and position) of limit cycles o...
7 pagesHistorical overview of Nash Problem of arcs in the EMS NewsletterThe goal of this paper is to...
This book presents in an elementary way the recent significant developments in the qualitative theor...
This book presents in an elementary way the recent significant developments in the qualitative theor...
Abstract. The second part of Hilbert's 16th problem deals with polynomial dierential equations ...
This book presents in an elementary way the recent significant developments in the qualitative theor...
For some perturbed Z2−(or Z4−)equivariant planar Hamiltonian vector field sequnces of degree n (n = ...
International audienceThis article uses analytic geometry methods to bound the number of limit cycle...
Abstract. Nash proved that every irreducible component of the space of arcs through a singularity co...
Using bifurcation methods and the Abelian integral, we investigate the number of the limit cycles th...
In this work we are concerned with the problem of shape and period of isolated periodic solutions of...
Recent work links certain aspects of the second part of Hilbertâ s 16th problem (H16) to the theory...
This article introduces an algebro-geometric setting for the space of bifurcation functions involved...
International audienceAbstract This paper introduces an algebro-geometric setting for the space of b...
The original Hilbert’s 16th problem can be split into four parts consisting of Problems A{D. In this...
1. Hilbert problem as a paradigm The question on the maximal number (and position) of limit cycles o...
7 pagesHistorical overview of Nash Problem of arcs in the EMS NewsletterThe goal of this paper is to...
This book presents in an elementary way the recent significant developments in the qualitative theor...
This book presents in an elementary way the recent significant developments in the qualitative theor...
Abstract. The second part of Hilbert's 16th problem deals with polynomial dierential equations ...
This book presents in an elementary way the recent significant developments in the qualitative theor...
For some perturbed Z2−(or Z4−)equivariant planar Hamiltonian vector field sequnces of degree n (n = ...
International audienceThis article uses analytic geometry methods to bound the number of limit cycle...
Abstract. Nash proved that every irreducible component of the space of arcs through a singularity co...
Using bifurcation methods and the Abelian integral, we investigate the number of the limit cycles th...
In this work we are concerned with the problem of shape and period of isolated periodic solutions of...
Recent work links certain aspects of the second part of Hilbertâ s 16th problem (H16) to the theory...