Abstract. The number of zeroes of the restriction of a given polynomial to the trajectory of a polynomial vector field in (Cn, 0), in a neighborhood of the origin, is bounded in terms of the degrees of the polynomials involved. In fact, we bound the number of zeroes, in a neighborhood of the origin, of the restriction to the given analytic curve in (Cn, 0) of an analytic function, linearly depending on parameters, through the stabilization time of the sequence of zero subspaces of Taylor coefficients of the composed series (which are linear forms in the parameters). Then a recent result of Gabrielov on multiplicities of the restrictions of polynomials to the trajectories of polynomial vector fields is used to bound the above stabilization m...
Consider planar ordinary differential equations of the form x = -yC(x, y), y = xC(x, y), where C(x, ...
AbstractWe study the dynamical behaviour of polynomial hamiltonian planar vector fields. Particularl...
Abstract. In this paper, we put restrictions on the coefficients of polynomials and give bounds conc...
Let ξ be a polynomial vector field on $^n$ with coefficients of degree d and P be a polynomial of de...
We put restrictions on the coefficients of polynomials and give bounds concerning the number of zero...
It is well known that the number of small amplitude limit cycles that can bifurcate from the origin ...
SIGLETIB: RN 6361 (1984,8) / FIZ - Fachinformationszzentrum Karlsruhe / TIB - Technische Information...
In this work we consider real analytic functions $d(z,\la,\e)$, where $d : \Omega \times \mathbb{R}^...
In this paper we consider the location of the zeros of a complex polynomial f(z) expressed as f(z) ...
The global behaviour of the control systems described by the pair of differential equations x =-f(x)...
this paper, concerns oscillatory properties of functions defined by polynomial ordinary differential...
The methods determining the accurate number of the polynomial roots inner algebraic field of the com...
Abstract. An elementary example shows that the number of zeroes of a component of a solution of a sy...
Ann. Inst. Fourier (Grenoble) 68 (2018) no.6, 2445-2476International audienceFor an analytic functio...
In the framework of multibody dynamics, the path motion constraint enforces that a body follows a pr...
Consider planar ordinary differential equations of the form x = -yC(x, y), y = xC(x, y), where C(x, ...
AbstractWe study the dynamical behaviour of polynomial hamiltonian planar vector fields. Particularl...
Abstract. In this paper, we put restrictions on the coefficients of polynomials and give bounds conc...
Let ξ be a polynomial vector field on $^n$ with coefficients of degree d and P be a polynomial of de...
We put restrictions on the coefficients of polynomials and give bounds concerning the number of zero...
It is well known that the number of small amplitude limit cycles that can bifurcate from the origin ...
SIGLETIB: RN 6361 (1984,8) / FIZ - Fachinformationszzentrum Karlsruhe / TIB - Technische Information...
In this work we consider real analytic functions $d(z,\la,\e)$, where $d : \Omega \times \mathbb{R}^...
In this paper we consider the location of the zeros of a complex polynomial f(z) expressed as f(z) ...
The global behaviour of the control systems described by the pair of differential equations x =-f(x)...
this paper, concerns oscillatory properties of functions defined by polynomial ordinary differential...
The methods determining the accurate number of the polynomial roots inner algebraic field of the com...
Abstract. An elementary example shows that the number of zeroes of a component of a solution of a sy...
Ann. Inst. Fourier (Grenoble) 68 (2018) no.6, 2445-2476International audienceFor an analytic functio...
In the framework of multibody dynamics, the path motion constraint enforces that a body follows a pr...
Consider planar ordinary differential equations of the form x = -yC(x, y), y = xC(x, y), where C(x, ...
AbstractWe study the dynamical behaviour of polynomial hamiltonian planar vector fields. Particularl...
Abstract. In this paper, we put restrictions on the coefficients of polynomials and give bounds conc...