Let G be a discrete subgroup of P U (1, n). Then G acts on P n C preserving the unit ball H n C , where it acts by isometries with respect to the Bergman metric. In this work we determine the equicontinuty region Eq(G) of G in P n C : It is the complement of the union of all complex projective hyperplanes in P n C which are tangent to ∂H n C at points in… (More)

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