Picard-Vessiot groups of Lauricella's hypergeometric systems EC and Calabi-Yau varieties arising integral representations
Abstract
We study the Zariski closure of the monodromy group Mon of Lauricella's hypergeometric function FC. If the identity component Mon0 acts irreducibly, then Mon SL2n(C) must be one of classical groups SL2n(C), SO2n(C) and Sp2n(C). We also study Calabi-Yau varieties arising from integral representations of FC.
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