Automorphisms of Generalized Fermat manifolds

Abstract

Let d ≥ 1, k ≥ 2 and n≥ d+1 be integers. A d-dimensional smooth complex algebraic variety M is called a generalized Fermat variety of type (d;k,n) if there is a Galois holomorphic branched covering π:M Pd, with deck group H Zkn, whose branch divisor consists of n+1 hyperplanes in general position, each one of branch order k. In this case, H is called a generalized Fermat group of type (d;k,n). In previous work, we proved that the generalized Fermat group H is unique in the following cases: (i) d=1 and (k-1)(n-1)>2, or (ii) d ≥ 2 and (d;k,n) \(2;2,5), (2;4,3)\. To obtain this uniqueness fact, we used a differential method due to Kontogeorgis. This paper provides a different and shorter proof of the uniqueness of H. We also study the locus of fixed points of subgroups of H.