Zpm-actions of type (d;p,n)
Abstract
A Zpm-action of type (d;p,n), where 2 ≤ d ≤ m ≤ n are integers, is a pair (S,N) where S is a d-dimensional compact complex manifold, N Zpm is a group of holomorphic automorphisms of S such that the quotient orbifold S/N is the d-dimensional projective space Pd whose branch locus consists of n+1 hyperplanes in general position, each one of branch order p. If (d;p,n) \(2;2,5),(2;4,3)\ and d+1 ≤ n, then we prove that: (i) N is a normal subgroup of Aut(S) and (ii) if (S,M) is a Zpm-action of type (d;p,n), then M=N. If, moreover, d+1 ≤ n ≤ 2d-1, then we observe that S is not algebraically hyperbolic
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