The essential spectrum, norm, and spectral radius of abstract multiplication operators
Abstract: Let $E$ be a complex Banach lattice and $T$ is an operator in the centrum $Z(E)={T: |T|\le \lambda I \mbox{ for some } \lambda}$ of $E$. Then the essential norm $|T|{e}$ of $T$ equals the essential spectral radius $r{e}(T)$ of $T$. We also prove $r_{e}(T)=\max{|T_{A{d}}|, r_{e}(T_{A})}$, where $T_{A}$ is the atomic part of $T$ and $T_{A{d}}$ is the non-atomic part of $T$. Moreover $r_{e}(T_{A})=\limsup_{\mathcal F}\lambda_{a}$, where $\mathcal F$ is the Fr\'echet filter on the set $A$ of all positive atoms in $E$ of norm one and $\lambda_{a}$ is given by $T_{A}a=\lambda_{a}a$ for all $a\in A$.
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