Calkin images of Fourier convolution operators with slowly oscillating symbols

Abstract

Let be a C*-subalgebra of L∞(R) and SOX(R) be the Banach algebra of slowly oscillating Fourier multipliers on a Banach function space X(R). We show that the intersection of the Calkin image of the algebra generated by the operators of multiplication aI by functions a∈ and the Calkin image of the algebra generated by the Fourier convolution operators W0(b) with symbols in SOX(R) coincides with the Calkin image of the algebra generated by the operators of multiplication by constants.