Spaces of multipliers and their preduals for the order multiplication on $[0,1]$. II
Volume 99 / 2004
Colloquium Mathematicum 99 (2004), 267-273
MSC: Primary 43A22.
DOI: 10.4064/cm99-2-10
Abstract
Consider $I=[0,1]$ as a compact topological semigroup with max multiplication and usual topology, and let $C(I),L^{p}(I),1\leq p\leq \infty $, be the associated algebras. The aim of this paper is to study the spaces $\mathop {\rm Hom}\nolimits _{C(I)}(L^{r}(I),L^{p}(I))$, $r>p$, and their preduals.
