A few last words on pointwise multipliers of Calder\'on--Lozanovskii spaces
Abstract
We will provide a complete description of the space M(XF,XG) of pointwise multipliers between two Calder\'on--Lozanovskii spaces XF and XG built upon a rearrangement invariant space X and two Young functions F and G. Meeting natural expectations, the space M(XF,XG) turns out to be another Calder\'on--Lozanovskii space XG F with G F being the appropriately understood generalized Young conjugate of G with respect to F. Nevertheless, our argument is not a mere transplantation of existing techniques and requires a rather delicate analysis of the interplay between the space X and functions F and G. Furthermore, as an example to illustrate applications, we will solve the factorization problem for Calder\'on--Lozanovskii spaces. All this not only complements and improves earlier results (basically giving them the final touch), but also confirms the conjecture formulated by Kolwicz, Le\'snik and Maligranda in [Pointwise multipliers of Calder\'on--Lozanovskii spaces, Math. Nachr. 286 (2012), no. 8-9, 876--907]. We will close this work by formulating a number of open questions that outline a promising panorama for future research.
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