Existence of Global Symmetry-Breaking Solutions in an Elastic Phase-Field Model for Lipid Bilayer Vesicles

We consider a well known model for lipid-bilayer membrane vesicles exhibiting phase separation, incorporating a phase field with finite curvature elasticity. We prove the existence of a plethora of equilibria, corresponding to symmetry-breaking solutions of the Euler-Lagrange equations, via global bifurcation from the spherical state. To the best of our knowledge, this constitutes the first rigorous existence results for this class of problems. We overcome several difficulties in carrying this out. Due to inherent in-plane fluidity combined with finite curvature elasticity, neither the Eulerian (spatial) nor the Lagrangian (material) description of the model lends itself well to analysis. Instead we adopt a singularity-free radial-map description that effectively eliminates the grossly underdetermined in-plane fluid deformation. The resulting governing equations comprise a quasi-linear elliptic system with lower-order nonlinear constraints. We then show the equivalence of our problem to that of finding the zeros of compact vector field. The latter is not routine; we obtain certain spectral estimates and then shift the principle part of the operator. With this in hand, we combine well known group-theoretic ideas for symmetry-breaking with global bifurcation theory to obtain our results.
Comment: An improved version - treating a more general model - has been uploaded