Emanuel Scheidegger
Published 2016-02-03Version 1
We perform the analytic continuation of solutions to the hypergeometric differential equation of order $n$ to the third regular singularity, usually denoted $z=1$, with the help of recurrences of their Mellin--Barnes integral representations. In the resonant case, there are necessarily logarithmic solutions. We apply the result to Picard-Fuchs equations of certain one--parameter families of Calabi--Yau manifolds, known as the mirror quartic and the mirror quintic.
Integral transformations of hypergeometric functions with several variables
On hypergeometric functions and Pochhammer $k$-symbol
Regularized Limit, analytic continuation and finite-part integration
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