Monodromy of the generalized hypergeometric equation in the Frobenius basis

Abstract

We consider monodromy groups of the generalized hypergeometric equation equation* [z(θ+α1)·s (θ+αn)-(θ+β1-1)·s (θ+βn-1)]f(z) = 0, where θ = z d/dz, equation* in a suitable basis, closely related to the Frobenius basis. We pay particular attention to the maximally unipotent case, where β1=…=βn=1, and present a theorem that enables us to determine the form of the corresponding monodromy matrices in the case where (X-e-2π iα1)·s (X-e-2π iαn) is a product of cyclotomic polynomials.