(CMC) 1-immersions of surfaces into hyperbolic 3-manifolds

Abstract

Constant Mean Curvature (CMC) 1-immersions of surfaces into hyperbolic 3-manifolds are natural and yet rather curious objects in hyperbolic geometry with interesting applications. Firstly, Bryant revealed surprising relations between (CMC) 1-immersions of surfaces into H3 (Bryant surfaces) and (cousins) minimal immersions into E3. In addition, the interest to (CMC) immersions of a surface S (closed, orientable, with genus g ≥2) into hyperbolic 3-manifolds was motivated by Uhlenbeck in connection to irreducible representations of the fundamental group π1(S) into PSL(2,C). However a (CMC) 1-immersed compact surface is likely to develop singularities (punctures at finitely many points), and indeed in our analysis the prescribed value 1 of the mean curvature enters as a "critical" parameter. In fact, Huang-Lucia-Tarantello showed that (CMC) c-immersions of S into hyperbolic 3-manifolds exist for |c | <1 and are parametrized by elements of the tangent bundle of the Teichmueller space of S. More importantly, (CMC) 1-immersions are attained only as "limits" for |c| 1- . In general the passage to the limit can be prevented by possible blow-up phenomena captured in terms of the Kodaira map and its suitable extension respectively for genus g=2 and g=3. Here we handle the case of surfaces of any genus. In Theorem , we are able to encompass the blow up situation in terms of an appropriate "orthogonality" condition. Subsequently, we can provide the existence and uniqueness of (CMC) 1-immersions under an appropriate "generic" condition, see Theorem 2.