Hopf bifurcation in a reaction-diffusive-advection two-species competition model with one delay

Hopf bifurcation in a reaction-diffusive-advection two-species competition model with one delay

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In this paper, we investigate a reaction-diffusive-advection two-species competition model with one delay and Dirichlet boundary conditions.The existence and multiplicity of spatially non-homogeneous steady-state jazzy select gt parts solutions are obtained.The stability of spatially nonhomogeneous steady-state solutions and the existence of Hopf bifurcation with the changes of the time delay are obtained by analyzing the distribution of eigenvalues of the infinitesimal generator associated with the linearized system.By the normal form theory and the center manifold reduction, the stability and bifurcation direction of Hopf bifurcating periodic orbits are derived.Finally, numerical simulations c6097b1028 are given to illustrate the theoretical results.