Semi-Fredholm singular integral operators with piecewise continuous coefficients on weighted variable Lebesgue spaces are Fredholm

Abstract

Suppose is a Carleson Jordan curve with logarithmic whirl points, is a Khvedelidze weight, p:(1,∞) is a continuous function satisfying |p(τ)-p(t)| -const/|τ-t| for |τ-t| 1/2, and Lp(·)(,) is a weighted generalized Lebesgue space with variable exponent. We prove that all semi-Fredholm operators in the algebra of singular integral operators with N× N matrix piecewise continuous coefficients are Fredholm on LNp(·)(,).