Local numerical range for a class of 2 d hermitian operators
Abstract
A local numerical range is analyzed for a family of circulant observables and states of composite 2 d systems. It is shown that for any 2 d circulant operator O there exists a basis giving rise to the matrix representation with real non-negative off-diagonal elements. In this basis the problem of finding extremum of O on product vectors x y ∈ C2 Cd reduces to the corresponding problem in R2 Rd. The final analytical result for d=2 is presented.
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