Figure 1From: Bifurcation analysis in a diffusive predator–prey system with Michaelis–Menten-type predator harvestingLeft: \(r_{1} = 0.200\), the positive equilibriums \(p ( {u_{0} ,v_{0} } ) \) is locally asymptotically stable. Right: \(r_{1} = 0.029\), \(p ( {u_{0},v_{0} } ) \) is unstable and has the bifurcating periodic orbitBack to article page