Existence of critical points with semi-stiff boundary conditions for singular perturbation problems in simply connected planar domains

Abstract

Let be a smooth bounded simply connected domain in R2. We investigate the existence of critical points of the energy E (u)=1/2∫ |∇ u|2+1/(42)∫ (1-|u|2)2, where the complex map u has modulus one and prescribed degree d on the boundary. Under suitable nondegeneracy assumptions on , we prove existence of critical points for small . More can be said when the prescribed degree equals one. First, we obtain existence of critical points in domains close to a disc. Next, we prove that critical points exist in "most" of the domains.