Abstract
A complex Hilbert space of dimension six supports at least three but not more than seven mutually unbiased bases. Two computer-aided analytical methods to tighten these bounds are reviewed, based on a discretization of parameter space and on Gröbner bases. A third algorithmic approach is presented: the non-existence of more than three mutually unbiased bases in composite dimensions can be decided by a global optimization method known as semidefinite programming. The method is used to confirm that the spectral matrix cannot be part of a complete set of seven mutually unbiased bases in dimension six. © 2010 IOP Publishing Ltd.
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CITATION STYLE
Brierley, S., & Weigert, S. (2010). Mutually unbiased bases and semi-definite programming. In Journal of Physics: Conference Series (Vol. 254). Institute of Physics Publishing. https://doi.org/10.1088/1742-6596/254/1/012008
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