W2,2-conformal immersions of a closed Riemann surface into n

Abstract

We study sequences fk:k n of conformally immersed, compact Riemann surfaces with fixed genus and Willmore energy W(f) ≤ . Assume that k converges to in moduli space, i.e. φk(k) as complex structures for diffeomorphisms φk. Then we construct a branched conformal immersion f: n and M\"obius transformations σk, such that for a subsequence σk fk φk f weakly in W2,2loc away from finitely many points. For < 8π the map f is unbranched. If the k diverge in moduli space, then we show k ∞ W(fk) ≥ (8π,ωnp). Our work generalizes results in K-S3 to arbitrary codimension.