Anna Szymusiak scite author profile

Anna Szymusiak

3Publications

95Citation Statements Received

217Citation Statements Given

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Institute of Mathematics, Jagiellonian University

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Highly symmetric POVMs and their informational power

Słomczyński

Szymusiak

2015

Quantum Inf Process

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We discuss the dependence of the Shannon entropy of normalized finite rank-1 POVMs on the choice of the input state, looking for the states that minimize this quantity. To distinguish the class of measurements where the problem can be solved analytically, we introduce the notion of highly symmetric POVMs and classify them in dimension 2 (for qubits). In this case, we prove that the entropy is minimal, and hence, the relative entropy (informational power) is maximal, if and only if the input state is orthogonal to one of the states constituting a POVM. The method used in the proof, employing the Michel theory of critical points for group action, the Hermite interpolation, and the structure of invariant polynomials for unitary-antiunitary groups, can also be applied in higher dimensions and for other entropy-like functions. The links between entropy minimization and entropic uncertainty relations, the Wehrl entropy, and the quantum dynamical entropy are described.

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Maximally informative ensembles for SIC-POVMs in dimension 3

Szymusiak¹

2014

J. Phys. A: Math. Theor.

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Abstract. In order to find out for which initial states of the system the uncertainty of the measurement outcomes will be minimal, one can look for the minimizers of the Shannon entropy of the measurement.In case of group covariant measurements this question becomes closely related to the problem how informative the measurement is in the sense of its informational power. Namely, the orbit under group action of the entropy minimizer corresponds to a maximally informative ensemble of equiprobable elements. We give a characterization of such ensembles for 3-dimensional group covariant (Weyl-Heisenberg) SIC-POVMs in both geometric and algebraic terms. It turns out that a maximally informative ensemble arises from the input state orthogonal to a subspace spanned by three linearly dependent vectors defining a SIC-POVM (geometrically) or from an eigenstate of certain Weyl's matrix (algebraically).

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Informational power of the Hoggar symmetric informationally complete positive operator-valued measure

Szymusiak

Słomczyński

2016

Phys. Rev. A

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Anna Szymusiak

Highly symmetric POVMs and their informational power

Maximally informative ensembles for SIC-POVMs in dimension 3

Informational power of the Hoggar symmetric informationally complete positive operator-valued measure

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