Super Picard-Fuchs Equation and Monodromies for Supermanifolds
Abstract
Following [1] and [2], we discuss the Picard-Fuchs equation for the super Landau-Ginsburg mirror to the super-Calabi-Yau in WCP(3|2)[1,1,1,3|1,5], (using techniques of [3,4]) Meijer basis of solutions and monodromies (at 0,1 and ∞) in the large and small complex structure limits, as well as obtain the mirror hypersurface, which in the large Kaehler limit, turns out to be either a bidegree-(6,6) hypersurface in WCP(3|1)[1,1,1,2] x WCP(1|1)[1,1|6] or a (Z2-singular) bidegree-(6,12) hypersurface in WCP(3|1)[1,1,2,6|6] x WCP(1|1)[1,1|6].
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