Some non-commutative averaging theorems
Abstract
Given n∈N any point on the closed unit disk D can be written as the average of n points on the unit circle S1. Here we discuss a non-commutative version of this result. We prove that for any Hilbert space H and a state φ:B(H), \φ(U): U\, unitary\=D. We also show that if H is finite, for any w∈D we can choose a unitary U with atmost 3 distinct eigenvalues such that φ(U)=w. Lastly, we prove the divisibility property for any state φ on B(H) where H is infinite-dimensional, showing that \φ(P) : P*=P2=P\=[0,1].
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