Robert Friedman, Radu Laza
Published 2013-01-11, updated 2013-04-20Version 2
We prove that, for every totally real number field E_0, there exists a weight three variation of Hodge structure of Calabi-Yau type defined over the rational numbers with associated endomorphism algebra E_0 such that the unique irreducible factor of Calabi-Yau type of the corresponding real variation of Hodge structure is the canonical real VHS of CY type over the Hermitian symmetric domain II_6, associated to the real group SO^*(12). The main point is a rationality result for the half spin representations of a form of the group SO^*(4m) defined over a number field.
Comments: 15 pages, typos fixed, other minor changes
Journal: Michigan Math. J. 63 (2014), no. 1, 83-99
A realization for a $\mathbb{Q}$-Hermitian variation of Hodge structure of Calabi-Yau type with real multiplication
Degenerations of Hodge structure
On families of K3 surfaces with real multiplication
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