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Random matrices and the Glasgow method

✍ Scribed by Miklós Adam Halász

Publisher
Elsevier Science
Year
1998
Tongue
English
Weight
497 KB
Volume
642
Category
Article
ISSN
0375-9474

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✦ Synopsis

A simple non-Hermitean random matrix (RM) model is used to study the Glasgow method of finite-density lattice &CD. The zeros of the RM partition function are evaluated through an averaging procedure, involving the zeros of the random 'propagator matrix' in the complex chemical-potential plane. The nature of the uncertainty affecting the results is similar to that produced by rounding errors in computing the known analytic result. This similarity is exploited to give quantitative estimates on the relationship between the size of the matrix and the number of configurations needed to achieve a given precision.

For the quenched ensemble considered here, the relationship is exponential.

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