Asymptotic analysis for approximate harmonic maps from degenerating cylinders and applications to minimal surfaces

Abstract

We investigate the blow-up analysis and quantitative behavior for a sequence of maps \un\n=1∞ from degenerating tori (T2,gn) or from degenerating cylinders (S1× [0,π],gn) with free boundary conditions un(S1× \0,π\)⊂ K to a compact Riemannian manifold (N,h) satisfying E(un)+\|τ(un,gn)\|L2≤ Λ<∞, where τ(un,gn) is the tension field of un, K⊂ N is a smooth submanifold. We establish generalized energy identities and prove that away from bubbles, the asymptotic limit of the necks are either some geodesics on N or some geodesic-like curves on K where some length formulas are given. This partially confirms a conjecture by Ding-Li-Liu Ding-Li-Liu in the sense of approximate sequence case. Moreover, we study an evolution system to seek minimal cylinders in a compact Riemannian manifold with free boundary and with arbitrary codimensions. By studying the convergence of the flow at infinity, we obtain some existence results of minimal cylinders with free boundary. Compared with the closed case in, an interesting new phenomenon here is that the neck may converges to a geodesic-like curve on K.