One-dimensional parameter-dependent boundary-value problems in H\"older spaces

Abstract

We study the most general class of linear boundary-value problems for systems of r-th order ordinary differential equations whose solutions range over the complex H\"older space Cn+r,α, with 0≤ n∈Z and 0<α≤1. We prove a constructive criterion under which the solution to an arbitrary parameter-dependent problem from this class is continuous in Cn+r,α with respect to the parameter. We also prove a two-sided estimate for the degree of convergence of this solution to the solution of the corresponding nonperturbed problem.