Bifurcation for the Lotka-Volterra competition model
Abstract
We analyze the bifurcation phenomenon for the following two-component competition system: equation* cases - u1=μ u1(1-u1)-β α u1u2,& in\ B1⊂ RN, - u2=σ u2(1-u2)-β γ u1u2,& in\ B1⊂ RN, ∂ u1∂ n= ∂ u2∂ n =0,&on\ ∂ B1, cases equation* where N 2, α>γ>0, σμ>0 and β>σγ. More precisely, treating β as the bifurcation parameter, we initially perform a local bifurcation analysis around the positive constant solutions, obtaining precise information of where bifurcation could occur, and determine the direction of bifurcation. As a byproduct, the instability of the constant solution is provided. Furthermore, we extend our exploration to the global bifurcation analysis. Lastly, under the condition σ=μ, we demonstrate the limiting configuration on each bifurcation branch as the competition rate β→+∞.
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