A note on lattice ordered C*-algebras and Perron--Frobenius theory
Abstract
A classical result of Sherman says that if the space of self-adjoint elements in a C*-algebra A is a lattice with respect to its canonical order, then A is commutative. We give a new proof of this theorem which shows that it is intrinsically connected with the spectral theory of positive operator semigroups. Our methods also show that some important Perron--Frobenius like spectral results fail to hold in any non-commutative C*-algebra.
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