Add to ORKGWe prove that the boundary of every parabolic component in the cubic polynomial slice P er1(1) is a Jordan curve by adapting the technique of para-puzzles presented in [10]. We also give a global description of the connected locus C1: it is the union of two main parabolic components and the limbs attached on their boundaries
We derive avalue to determine the shape of aparametric cubic curve segment without use of trans-form...
AbstractThe parabola, in parametric form, is discussed as a suitable approximation to curved boundar...
We investigate a relationship between escape regions in slices of the parameter space of cubic polyn...
We prove that the boundary of every parabolic component in the cubic polynomial slice P er1(1) is a ...
We prove that every parabolic component in the cubic polynomial slice $Per_1(e^{2\pi i\frac{p}{q}})$...
In this note, the dynamics of a family of cubic polynomials with a parabolic fixed point of multipli...
A brief summary of Archimedes\u27 Quadrature of the Parabola is given showing the use of recursive...
We describe a topological relationship between slices of the parameter space of cubic maps. In the p...
AbstractParametric polynomial cubic curve segments are widely used in computer-aided design and comp...
26 pagesA cubic polynomial $f$ with a periodic Siegel disk containing an eventual image of a critica...
A conic section is a plane quadratic curve, that is, the graph of an equation of the form ax² + bxy ...
4 pagesInternational audienceWe construct a polynomial of degree d in two variables whose Hessian cu...
In this paper, a particular shape preserving parametric polynomial approximation of conic sections i...
In this paper we derive formulas for computing graphical derivatives of the (possibly multivalued) s...
We derive a value to determine the shape of a parametric cubic curve segment without use of trans-fo...
We derive avalue to determine the shape of aparametric cubic curve segment without use of trans-form...
AbstractThe parabola, in parametric form, is discussed as a suitable approximation to curved boundar...
We investigate a relationship between escape regions in slices of the parameter space of cubic polyn...
We prove that the boundary of every parabolic component in the cubic polynomial slice P er1(1) is a ...
We prove that every parabolic component in the cubic polynomial slice $Per_1(e^{2\pi i\frac{p}{q}})$...
In this note, the dynamics of a family of cubic polynomials with a parabolic fixed point of multipli...
A brief summary of Archimedes\u27 Quadrature of the Parabola is given showing the use of recursive...
We describe a topological relationship between slices of the parameter space of cubic maps. In the p...
AbstractParametric polynomial cubic curve segments are widely used in computer-aided design and comp...
26 pagesA cubic polynomial $f$ with a periodic Siegel disk containing an eventual image of a critica...
A conic section is a plane quadratic curve, that is, the graph of an equation of the form ax² + bxy ...
4 pagesInternational audienceWe construct a polynomial of degree d in two variables whose Hessian cu...
In this paper, a particular shape preserving parametric polynomial approximation of conic sections i...
In this paper we derive formulas for computing graphical derivatives of the (possibly multivalued) s...
We derive a value to determine the shape of a parametric cubic curve segment without use of trans-fo...
We derive avalue to determine the shape of aparametric cubic curve segment without use of trans-form...
AbstractThe parabola, in parametric form, is discussed as a suitable approximation to curved boundar...
We investigate a relationship between escape regions in slices of the parameter space of cubic polyn...