Existence of Stable Subharmonic Solutions for Reaction-Diffusion Equations

In this article, a class of reaction diffusion functional differential equations is investigated. The global existence and uniqueness of solutions and the stability of the trivial solution are obtained. Some applications are also discussed. The method proposed in this article is a combination of the

Using variational methods we study the existence and multiplicity of solutions of the Dirichlet problem for the equation p py2 ydiv a ٌu ٌu ٌu s f x, u .

In this paper we shall study the existence of a periodic solution to the nonlinear Ž . Ž Ž .. differential equation x q Ax y A\*x y A\*Ax q B t x q f t, x t s 0 in some complex Hilbert space, using duality and variational methods.

The system u 1t &2u 1 =u 1 u 2 &bu 1 , u 2t &2u 2 =au 1 in 0\_(0, T), where 0/R n is a smooth bounded domain, with homogeneous Dirichlet boundary conditions u 1 = u 2 =0 on 0\_(0, T) and initial conditions u 1 (x, 0), u 2 (x, 0), is studied. First, it is proved that there is at least one positive st