On Some Algebraic Properties of Hermite--Pad\'e Polynomials

Abstract

Let [f0,…,fm] be a tuple of series in nonnegative powers of 1/z, fj(∞)≠0. It is supposed that the tuple is in "general position". We give a construction of type I and type II Hermite--Pad\'e polynomials to the given tuple of degrees ≤n and ≤mn respectively and the corresponding (m+1)-multi-indexes with the following property. Let M1(z) and M2(z) be two (m+1)×(m+1) polynomial matrices, M1(z),M2(z)∈GL(m+1, C[z]), generated by type I and type II Hermite--Pad\'e polynomials respectively. Then we have M1(z)M2(z) Im+1, where Im+1 is the identity (m+1)×(m+1)-matrix. The result is motivated by some novel applications of Hermite--Pad\'e polynomials to the investigation of monodromy properties of Fuchsian systems of differential equations.