A remark on K3s of Todorov type (0,9) and (0,10)

Details A remark on K3s of Todorov type (0,9) and (0,10) A remark on K3s of Todorov type (0,9) and (0,10)

2002-05-14

arxiv.org/abs/math/0205146v1

Mathematics

Algebraic Geometry

Scientific paper

Frequentely it happens that isogenous (in the sense of Mukai) K3 surfaces are partners of each other and sometimes they are even isomorphic. This is due, in some cases, to the (too high, e.g. bigger then or equal to 12) rank of the Picard lattice as showed by Mukai in [Muk3]. In other cases this is due to the structure of the Picard lattice and not only on its rank. This is the case, for example, of K3s with Picard lattice containing a latice of Todorov type (0,9) or (0,10)

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