Dynamic Analysis of a Fractional Order Phytoplankton-Zooplankton System with a Crowley-Martin Functional Response

Abstract

In this work, we investigate the dynamical behaviour of a fractional order phytoplankton-zooplankton system(PZS) with with a Crowley-Martin functional response. Local stability analysis of biologically feasible equilibrium points is worked out with help of ecological as well as disease basic reproduction numbers. We proved that the equilibrium $E_0=(0,0,0)$ of the PZS  is a saddle
point. We proved that the equilibrium $E_1=(\frac{1}{\gamma},0,0)$ of the system is asymptotically stabile if $R_0<1$  and $R_0^*<1$. Also we proved that the equilibrium $E_2=(S_2,I_2,0)$ of the system if $R_0(1)>1$.
Numerical simulations are carried out for a hypothetical set of
parameter values to substantiate our analytical findings.