Control of chaos in delay differential equations, in a network of oscillators and in model cortex

Neurobiological studies have indicated that rapid transitions between chaotic and relatively more ordered states may be the key towards understanding how the brain performs cognitive tasks. This immediately suggests that methods of controlling chaos put forward by Ott et al. and Hunt may be used to

this paper, we shall study the oscillation of all positive solutions of the nonlinear delav differential eouation and x'(t) + ckvmx(t)xn(t -7) x @+x"(t-7) = ' x'(t) + p(t) -F(t) r+xn(t-T) = 0 (\*\*) about their equilibrium points. Also, we study the stability of these equilibrium points and prove

This article is devoted to the problem of existence of positive solution for common classes of nonlinear retarded functional differential equations. Some criteria of its existence are proved, as well as some comparison results. The obtained results are applied to the linear case. Moreover, the exist