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| λ I for some λ\ of E. Then the essential norm \|T\|e of T equals the essential spectral radius re(T) of T. We also prove re(T)=\\|TAd\|, re(TA)\, where TA is the atomic part of T and TAd is the non-atomic part of T. Moreover re(TA)= Fλa, where F is the Fr\'echet filter on the set A of all positive atoms in E of norm one and λa is given by TAa=λaa for all a∈ A.
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