Bifurcation for the Lotka-Volterra competition model

We analyze the bifurcation phenomenon for the following two-component competition system: \begin{equation*} \begin{cases} -Δu_1=μu_1(1-u_1)-βαu_1u_2,& \text{in}\ B_1\subset \mathbb{R}^N, -Δu_2=σu_2(1-u_2)-βγu_1u_2,& \text{in}\ B_1\subset \mathbb{R}^N, \frac{\partial u_1}{\partial n}= \frac{\partial u_2}{\partial n} =0,&\text{on}\ \partial B_1, \end{cases} \end{equation*} where $N\ge 2$, $α>γ>0$, $σ\geμ>0$ and $β>\fracσγ$. 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 $β\rightarrow+\infty$.