Periodic solutions of reaction diffusion systems in a half-space domain

The purpose of this paper is to show the existence and uniqueness of a solution to a coupled system of time-delayed reaction-diffusion equations in a halfspace domain under some nonlinear boundary conditions. The approach to the problem is by the method of upper and lower solutions and the integral

The author studies the periodic time-dependent quasimonotone reactiondiffusion systems in a proper Banach space satisfying (i) ∂F i /∂u j ≥ 0 for all 1 ≤ i = j ≤ n; (ii) F t x u is periodic in t of period τ > 0; and (iii) F i t x αu ≥ αF i t x u for all α ∈ 0 1 and i = 1 2 n. It is proved that ever

In this paper, necessary and suficient conditions are derived for the existence of temporally periodic "dissipative structure" solutions in cases of weak diffusion with the reaction rate terms dominant in a generic system of reaction--diffusion equations hi/at = Di V2 ci + Qi(c), where the enumerato

We shall construct a periodic strong solution of the Navier-Stokes equations for some periodic external force in a perturbed half-space and an aperture domain of the dimension n¿3. Our proof is based on L p -L q estimates of the Stokes semigroup. We apply L p -L q estimates to the integral equation

In this paper, we consider the existence of periodic solutions of reaction diffusion systems by using S 1 -degree theory due to Dylawerski et al., see Jodel et al. (Ann. Pol. Math. 41 (1991) 243).