Study on the family of K3 surfaces induced from the lattice $(D4)3 < -2 > < 2 >
Abstract
Let us consider the rank 14 lattice P=D43 < -2> < 2>. We define a K3 surface S of type P with the property that P⊂ Pic(S) , where Pic(S) indicates the Picard lattice of S. In this article we study the family of K3 surfaces of type P with a certain fixed multipolarization. We note the orthogonal complement of P in the K3 lattice takes the form U(2) U(2) (-2I4). We show the following results: (1) A K3 surface of type P has a representation as a double cover over P1× P1 as the following affine form in (s,t,w) space: S=S(x): w2=Πk=14 (x1(k)st+x2(k)s+x3(k)t+x4(k)), \ xk=x1(k)&x2(k) x3(k)&x4(k) ∈ M(2, C). We make explicit description of the Picard lattice and the transcendental lattice of S(x). (2) We describe the period domain for our family of marked K3 surfaces and determine the modular group. (3) We describe the differential equation for the period integral of S(x) as a function of x∈ (GL(2, C))4. That bocomes to be a certain kind of hypergeometric one. We determine the rank, the singular locus and the monodromy group for it. (4) It appears a family of 8 dimensional abelian varieties as the family of Kuga-Satake varieties for our K3 surfaces. The abelian variety is characterized by the property that the endomorphism algebra contains the Hamilton quarternion field over Q.
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