Triangularisation of Singularly Perturbed Logarithmic Differential Systems of Rank 2

Abstract

We study singularly perturbed linear systems of rank two of ordinary differential equations of the form x∂x (x, ) + A (x, ) (x, ) = 0, with a regular singularity at x = 0, and with a fixed asymptotic regularity in the perturbation parameter of Gevrey type in a fixed sector. We show that such systems can be put into an upper-triangular form by means of holomorphic gauge transformations which are also Gevrey in the perturbation parameter in the same sector. We use this result to construct a family in of Levelt filtrations which specialise to the usual Levelt filtration for every fixed nonzero value of ; this family of filtrations recovers in the 0 limit the eigen-decomposition for the -leading-order of the matrix A (x, ), and also recovers in the x 0 limit the eigen-decomposition of the residue matrix A (0, ).