Uniqueness of Generalized Fermat Groups in positive characteristic

Abstract

Let X⊂ PKm be a smooth irreducible projective algebraic variety of dimension d, defined over an algebraically closed field K of characteristic p>0. We say that X is a generalized Fermat variety of type (d;k,n), where n ≥ d+1 and k ≥ 2 is relatively prime to p, if there is a Galois branched covering π X PKd, with deck group Zkn H<Aut(X), whose branch divisor consists of n+1 hyperplanes in general position (each one of branch order k). In this case, the group H is called a generalized Fermat group of type (d;k,n). We prove that, if k-1 is not a power of p and either (i) p=2 or (ii) p>2 and (d;k,n) \(2;2,5), (2;4,3)\, then a generalized Fermat variety of type (d;k,n) has a unique generalized Fermat group of that type.

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