The monodromy representation of a hypergeometric system in m variables of rank pm

Abstract

We study the monodromy representation of the hypergeometric system FCp,m(a,B) in m variables of rank pm with parameters a and B. This system can be regarded as a multi-variable model of the generalized hypergeometric equation of rank p. We construct m+1 loops which generate the fundamental group of the complement of the singular locus of FCp,m(a,B), and we show that they satisfy certain relations as elements of the fundamental group. We produce circuit matrices along these loops with respect to a fundamental system of solutions to FCp,m(a,B) under certain non-integrality conditions on parameters a and B.