Complex projective structures on Kleinian groups
نویسنده
چکیده
Let M be a compact, oriented, irreducible, and boundary incompressible 3–manifold. Assume that its fundamental group is without rank two abelian subgroups and ∂M 6= ∅. We will show that every homomorphism θ: π1(M )→ PSL(2,C) which is not “boundary elementary” is induced by a possibly branched complex projective structure on the boundary of a hyperbolic manifold homeomorphic to M . AMS Classification 30F50; 30F45, 30F60, 30F99, 30C99
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تاریخ انتشار 1998