Periods of singular double octic Calabi-Yau threefolds and modular forms
Abstract
By the modularity theorem every rigid Calabi-Yau threefold X has associated modular form f such that the equality of L-functions L(X,s)=L(f,s) holds. In this case period integrals of X are expected to be expressible in terms of the special values L(f,1) and L(f,2). We propose a similar interpretation of period integrals of a nodal model of X. It is given in terms of certain variants of a Mellin transform of f. We provide numerical evidence towards this interpretation based on a case of double octics.
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