Mixed Riemann-Hilbert boundary value problem with simply connected fibers

Abstract

We study the existence of solutions of mixed Riemann-Hilbert or Cherepanov boundary value problem with simply connected fibers on the unit disk . Let L be a closed arc on ∂ with the end points ω-1, ω1 and let a be a smooth function on L with no zeros. Let γ, ∈∂L, be a smooth family of smooth Jordan curves in the complex plane which all contain point 0 in their interiors and such that γω-1, γω1 are strongly starshaped with respect to 0. Then under condition that for each w∈γω 1 the angle between w and the normal to γω 1 at w is less than π10, there exists a H\"older continuous function f on , holomorphic on , such that Re(a() f()) = 0 on L and f()∈γ on ∂L.