Numerical bifurcation and stability analysis of an predator-prey system with generalized Holling type III functional response

Numerical bifurcation and stability analysis of an predator-prey system with generalized Holling type III functional response

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We perform a bifurcation analysis of a predator-prey model with Holling functional response.The analysis is carried out both analytically and numerically.We QUERCETIN LIPOMICEL use dynamical toolbox MATCONT to perform numerical bifurcation analysis.

Our bifurcation analysis of the model indicates that it exhibits numerous types of bifurcation phenomena, including fold, subcritical Hopf, cusp, Bogdanov-Takens.By starting from a Hopf bifurcation point, we approximate limit cycles which are obtained, step by Belling BI602G Built In A Gas Single Oven 60cm Stainless Steel step, using numerical continuation method and compute orbitally asymptotically stable periodic orbits.