A reaction-diffusion system of a competitor-competitor-mutualist model

In this paper we investigate the existence and the asymptotic behavior of periodic solutions for a periodic reaction-diffusion system of a competitorcompetitor-mutualist model under Dirichlet boundary conditions. We shall prove that under certain conditions this system is persistent and under some o

10). This indicated that nonspecific degradation was DNA in the lower part of the gel. As a general conclusion, in order to not obscure similar analyses by the not the case for the observed anomalous appearance of our samples. We could also exclude agarose quality, phenomenon we described here, we r

Matrix metalloproteinases (MMPs) are a family of Zn2+ endopeptidases that are expressed in many inflammatory conditions and that contribute to connective tissue breakdown and the release of the pro-inflammatory cytokine tumour necrosis factor-a (TNF-a). There is emerging evidence that MMPs have a ro

Numerical computations for a one (space) dimensional reaction-diffusion system, exhibiting alternate regimes of periodic-aperiodic behaviour, are reported in this study. The bifurcation analysis reveals the following routes to chaos: (a) stable steady state -+ limit cycle -+ doubly periodic orbit --