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The transcendental part of the regulator map for K_1 on a mirror family of K3 surfaces | | Pedro Luis del Angel
; Stefan Mueller-Stach
; | | Date: |
28 Aug 2000 | | Subject: | Algebraic Geometry MSC-class: 14C25, 19E20 | math.AG | | Affiliation: | Cimat, Mex.), Stefan Mueller-Stach (Univ. of Essen | | Abstract: | We compute the transcendental part of the normal function corresponding to the Deligne class of a cycle in K_1 of a mirror family of quartic K3 surfaces. The resulting multivalued function does not satisfy the hypergeometric differential equation of the periods and we conclude that the cycle is indecomposable for most points in the mirror family. The occurring inhomogenous Picard-Fuchs equation are related to Painlevé VI type differential equations. | | Source: | arXiv, math.AG/0008207 | | Services: | Forum | Review | PDF | Favorites | |
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