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We resolve the centre-focus problem for a specific class of cubic systems and determine the number of limit cycles which can bifurcate from a fine focus. We also describe the methods which we have developed to investigate these questions in general. These involve extensive use of Computer Algebra; we have chosen to use REDUCE.

Fixed point analysis for non-oscillatory solutions of quasi linear ordinary differential equations

Luisa Malaguti, Valentina Taddei (2005)

Acta Universitatis Palackianae Olomucensis. Facultas Rerum Naturalium. Mathematica

The paper deals with the quasi-linear ordinary differential equation ${(r (t) ϕ (u^{'}))}^{'} + g (t, u) = 0$ with $t \in [0, \infty)$ . We treat the case when $g$ is not necessarily monotone in its second argument and assume usual conditions on $r (t)$ and $ϕ (u)$ . We find necessary and sufficient conditions for the existence of unbounded non-oscillatory solutions. By means of a fixed point technique we investigate their growth, proving the coexistence of solutions with different asymptotic behaviors. The results generalize previous ones due to Elbert–Kusano, [Acta...

Fixed points, periodic points, and coin-tossing sequences for mappings defined on two-dimensional cells.

Papini, Duccio, Zanolin, Fabio (2004)

Fixed Point Theory and Applications [electronic only]

Flatness and Monge parameterization of two-input systems, control-affine with 4 states or general with 3 states

David Avanessoff, Jean-Baptiste Pomet (2007)

ESAIM: Control, Optimisation and Calculus of Variations

This paper studies Monge parameterization, or differential flatness, of control-affine systems with four states and two controls. Some of them are known to be flat, and this implies admitting a Monge parameterization. Focusing on systems outside this class, we describe the only possible structure of such a parameterization for these systems, and give a lower bound on the order of this parameterization, if it exists. This lower-bound is good enough to recover the known results about “(x,u)-flatness”...

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Factoring linear differential operators on measure chains.

Familles de branches de bifurcations dans les équations de Ginzburg-Landau

Fast and heteroclinic solutions for a second order ODE.

Feuilletages de briot et Bouquet.

Fiber preserving transformations and the equation $y^{'''} = f (x, y, y^{'}, y^{''})$ .

Finding the Boundary Curves of the Third Order Linear Ordinary Differential Equation

Finiteness of the set of solutions of some boundary-value problems for ordinary differential equations

First integrals for the Duffing-Van der Pol type oscillator.

First integrals for two linearly coupled nonlinear Duffing oscillators.

First order elliptic systems and the existence of homoclinic orbits in Hamiltonian systems.

First phases of the associated equation with parameters for the differential equation $y^{''} = q (t) y$

Five limit cycles for a simple cubic system.

Fixed point analysis for non-oscillatory solutions of quasi linear ordinary differential equations

Fixed points, periodic points, and coin-tossing sequences for mappings defined on two-dimensional cells.

Flatness and Monge parameterization of two-input systems, control-affine with 4 states or general with 3 states

Floquet theory for linear differential equations with meromorphic solutions.

Flots sur le tore et nombres de rotation

Fluctuation patterns and conditional reversibility in nonequilibrium systems

Fonctions de Mathieu et fonctions propres de l'oscillateur relativiste

Forced oscillation of second order nonlinear dynamic equations on time scales.

Currently displaying 1 – 20 of 38