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arxiv: alg-geom/9701011 · v2 · submitted 1997-01-24 · alg-geom · hep-th· math.AG· math.QA· q-alg

K3 surfaces with interesting groups of automorphisms

classification alg-geom hep-thmath.AGmath.QAq-alg
keywords grouplatticespicardhyperbolicresultautomorphismfinitenesslattice
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By the fundamental result of I.I. Piatetsky-Shapiro and I.R. Shafarevich (1971), the automorphism group Aut(X) of a K3 surface X over C and its action on the Picard lattice S_X are prescribed by the Picard lattice S_X. We use this result and our method (1980) to show finiteness of the set of Picard lattices S_X of rank $\ge 3$ such that the automorphism group Aut(X) of the K3 surface X has a non-trivial invariant sublattice S_0 in S_X where the group Aut(X) acts as a finite group. For hyperbolic and parabolic lattices S_0 it has been proved by the author before (1980, 1995). Thus we extend this results to negative sublattices S_0. We give several examples of Picard lattices S_X with parabolic and negative S_0. We also formulate the corresponding finiteness result for reflective hyperbolic lattices of hyperbolic type over purely real algebraic number fields. These results are important for the theory of Lorentzian Kac--Moody algebras and Mirror Symmetry.

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