Extendability of conformal structures on punctured surfaces

Abstract

For a smooth immersion f from the punctured disk D\0\ into Rn extendable continuously at the puncture, if its mean curvature is square integrable and the measure of f(D) Brk=o(rk) for a sequence rk 0, we show that the Riemannian surface (Dr\0\,g) where g is the induced metric is conformally equivalent to the unit Euclidean punctured disk, for any r∈(0,1). For a locally W2,2 Lipschitz immersion f from the punctured disk D2\0\ into Rn, if \|∇ f\|L∞ is finite and the second fundamental form of f is in L2, we show that there exists a homeomorphism φ:D D such that fφ is a branched W2,2-conformal immersion from the Euclidean unit disk D into Rn.