Notes on the numerical radius for adjointable operators on Hilbert C*-modules
Abstract
Given a Hilbert module H over a C*-algebra, let L(H) be the set of all adjointable operators on H. For each T∈L(H), its numerical radius is defined by w(T)=\\| Tx, x \|: x∈ H, \|x\|=1\. It is proved that w(T)=\|T\| whenever T is normal. Examples are constructed to show that there exist Hilbert module H over certain C*-algebra and T1,T2∈ L(H) with T12=0 such that w(T1) 12 \|T1\| and θ∈ [0,2π]\|Re(eiθT2)\|<w(T2). In addition, a new characterization of the spatial numerical radius is given, and it is proved that w(π(T)) w(T) for every faithful representation (π, X) of L(H) and every T∈L(H). Some inequalities are derived based on the newly obtained results.
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