The Oregonator model with the homogeneous Neumann boundary condition is studied. By the stability theory of linear operators, the stability of positive constant solution is discussed.By using bifurcation theory and regarding diffusion coefficient d1 as bifurcation parameter, the local and global bifurcations from the positive constant steadystate are investigated. The sufficient conditions for the existence of positive nonconstant steadystate solution are gained. It is shown that the model has positive nonconstant solution whenever diffusion coefficient d1 belongs to the open interval from 0 to the bifurcation point d1j and is not equal arbitrary bifurcation point.

Oregonator model; positive constant solution; bifurcation