Some Results on the Stability and Bifurcation of Stationary Solutions of Delay-Diffusion Equations

## Abstract In this paper, we present an analysis for the class of delay differential equations with one discrete delay and the right‐hand side depending only on the past. We extend the results from paper by U. Foryś (__Appl. Math. Lett.__ 2004; **17**(5):581–584), where the right‐hand side is a un

We consider a predator᎐prey system with one or two delays and a unique positive equilibrium E#. Its dynamics are studied in terms of the local stability of E# and of the description of the Hopf bifurcation that is proven to exist as one of Ž . the delays taken as a parameter crosses some critical va

A set of criteria is presented for the global exponential stability and the Ž . existence of periodic solutions of delayed cellular neural networks DCNNs by constructing suitable Lyapunov functionals, introducing many parameters and combining with the elementary inequality technique. These criteria

The cell discretization algorithm, a nonconforming extension of the finite element method, is used to obtain approximations to the velocity and pressure functions satisfying the Stokes equations. Error estimates show convergence of the method. An implementation using polynomial bases is described th