Global bifurcations of nodal solutions for coupled elliptic equations
Abstract
We investigate the global bifurcation structure of the radial nodal solutions to the coupled elliptic equations equation \ arraylr -u+u=u3+β uv2 in B1 , -v+v=v3+β u2v in B1 , u,v∈ H0,r1(B1). array . equation Here B1 is a unit ball in R3 and β∈R the coupling constant is used as bifurcation parameter. For each k, the unique pair of nodal solutions wk with exactly k-1 zeroes to the scalar field equation - w + w=w3 generate exactly four synchronized solution curves and exactly four semi-trivial solution curves to the above system. We obtain a fairly complete global bifurcation structure of all bifurcating branches emanating from these eight solution curves of the system, and show that for different k these bifurcation structures are disjoint. We obtain exact and distinct nodal information for each of the bifurcating branches, thus providing a fairly complete characterization of nodal solutions of the system in terms of the coupling.
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