Algebras of convolution type operators with continuous data do not always contain all rank one operators

Abstract

Let X(R) be a separable Banach function space such that the Hardy-Littlewood maximal operator is bounded X(R) and on its associate space X'(R). The algebra CX(R) of continuous Fourier multipliers on X(R) is defined as the closure of the set of continuous functions of bounded variation on R=R\∞\ with respect to the multiplier norm. It was proved by C. Fernandes, Yu. Karlovich and the first author FKK19 that if the space X(R) is reflexive, then the ideal of compact operators is contained in the Banach algebra AX(R) generated by all multiplication operators aI by continuous functions a∈ C(R) and by all Fourier convolution operators W0(b) with symbols b∈ CX(R). We show that there are separable and non-reflexive Banach function spaces X(R) such that the algebra AX(R) does not contain all rank one operators. In particular, this happens in the case of the Lorentz spaces Lp,1(R) with 1<p<∞.