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Quantum Measurements and Finite Geometry
Foundations of Physics 36 (1):112-126 (2006)
Abstract
A complete set of mutually unbiased bases for a Hilbert space of dimension N is analogous in some respects to a certain finite geometric structure, namely, an affine plane. Another kind of quantum measurement, known as a symmetric informationally complete positive-operator-valued measure, is, remarkably, also analogous to an affine plane, but with the roles of points and lines interchanged. In this paper I present these analogies and ask whether they shed any light on the existence or non-existence of such symmetric quantum measurements for a general quantum system with a finite-dimensional state spaceOther Versions
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A Survey of Finite Algebraic Geometrical Structures Underlying Mutually Unbiased Quantum Measurements.Michel Planat, Haret C. Rosu & Serge Perrine - 2006 - Foundations of Physics 36 (11):1662-1680.
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