Impulsive Delayed Lasota-Wazewska Fractional Models: Global Stability of Integral Manifolds

In this paper we deal with the problems of existence, boundedness and global stability of integral manifolds for impulsive Lasota-Wazewska equations of fractional order with time-varying delays and variable impulsive perturbations. The main results are obtained by employing the fractional Lyapunov method and comparison principle for impulsive fractional differential equations. With this research we generalize and improve some existing results on fractional-order models of cell production systems. These models and applied technique can be used in the investigation of integral manifolds in a wide range of biological and chemical processes.