Não disponívelThe author is concerned with the equation u +u = g(u, p) + μf(t), where p, μ are small parameters, f is an even, continuous π - periodic function, g is an odd smooth function of u, such that g(u,p) = O ( Ι pu Ι+ Ι u3 Ι), as p and u go to zero. The main results are that, under certain conditions, the small 2π - periodic solutions maintain some symmetry properties of the forcing function f(t), when μ≠O. Some other interesting results describe the variation of the number of such solutions as p and μ vary in à small neighbourhood of the origin. The author uses the approach of Alternative Problems
We study some properties of the range of the relativistic pendulum operator $\mathcal P$, that is, t...
Não disponívelSuppose the second-order equation x + g(x, x) = O has a periodic solution x0 , where g...
This paper is devoted to study the existence of periodic solutions to the second-order differential ...
Não disponívelThe author is concerned with the equation u +u = g(u, p) + μf(t), where p, μ ar...
We study differential equations with periodic nonlinearities. In particular, we prove that for a sma...
The problem of existence of periodic solutions is one of the traditional problems of the theory of d...
Altres ajuts: ICREA AcademiaWe provide sufficient conditions for the existence of periodic solutions...
AbstractWe study the T-periodic solutions of the forced pendulum equation u″+cu′+a sin(u)=λf(t), whe...
In a previous paper we have shown that, using the differential equations of the trajectories of Jaco...
We study the periodic solutions of the second-order differential equations of the form ẍ ± xn = µf ...
AbstractExistence of periodic solutions for a kind of Rayleigh equation with a deviating argument x″...
International audienceWe consider forced Liénard differential equations in the form x''(t) + f(x(t),...
Agraïments: The second author is partially supported by a FAPESP-BRAZIL grant 2007/06896-5. Both aut...
The theory of Poincaré and Bendixson is applied to establish the existence of periodic solutions of ...
We provide sufficient conditions for the existence of periodic solutions of the fourth-order differe...
We study some properties of the range of the relativistic pendulum operator $\mathcal P$, that is, t...
Não disponívelSuppose the second-order equation x + g(x, x) = O has a periodic solution x0 , where g...
This paper is devoted to study the existence of periodic solutions to the second-order differential ...
Não disponívelThe author is concerned with the equation u +u = g(u, p) + μf(t), where p, μ ar...
We study differential equations with periodic nonlinearities. In particular, we prove that for a sma...
The problem of existence of periodic solutions is one of the traditional problems of the theory of d...
Altres ajuts: ICREA AcademiaWe provide sufficient conditions for the existence of periodic solutions...
AbstractWe study the T-periodic solutions of the forced pendulum equation u″+cu′+a sin(u)=λf(t), whe...
In a previous paper we have shown that, using the differential equations of the trajectories of Jaco...
We study the periodic solutions of the second-order differential equations of the form ẍ ± xn = µf ...
AbstractExistence of periodic solutions for a kind of Rayleigh equation with a deviating argument x″...
International audienceWe consider forced Liénard differential equations in the form x''(t) + f(x(t),...
Agraïments: The second author is partially supported by a FAPESP-BRAZIL grant 2007/06896-5. Both aut...
The theory of Poincaré and Bendixson is applied to establish the existence of periodic solutions of ...
We provide sufficient conditions for the existence of periodic solutions of the fourth-order differe...
We study some properties of the range of the relativistic pendulum operator $\mathcal P$, that is, t...
Não disponívelSuppose the second-order equation x + g(x, x) = O has a periodic solution x0 , where g...
This paper is devoted to study the existence of periodic solutions to the second-order differential ...