Duality for hypergeometric functions and invariant Gauss-Manin systems

If for a difference equation no stability theorem applies, it is necessary to examine this difference equation directly. For many equations, however, it is neither obvious whether solutions are bounded or stable, nor is it trivial to prove such behavior. A useful way to prove boundedness is to find

An algorithm is developed to generate a class of matrices N which, when nonsingular, red& a co&a@ square matrix A by a kmilarit~ transfomnation C = NAN-l to the Cwnpanion form. The coeficients of the characteristic equation 1 s1 -A 1 = 0 are dkplayed in the last row of C: stability of the multivaria

Let G be a connected semisimple algebraic group over C, P a parabolic subgroup, g and p their Lie algebras. We prove a microlocal version of Gyoja's conjectures [2] about a relation between the irreducibility of generalized Verma modules on g induced from p and the zeroes of b-functions of P -semi-i