arXiv:0907.4929 Abstract | arXiv Analytics

arXiv:0907.4929 [math-ph]Abstract References Reviews Resources

Random matrices and Laplacian growth

Published 2009-07-28Version 1

The theory of random matrices with eigenvalues distributed in the complex plane and more general "beta-ensembles" (logarithmic gases in 2D) is reviewed. The distribution and correlations of the eigenvalues are investigated in the large N limit. It is shown that in this limit the model is mathematically equivalent to a class of diffusion-controlled growth models for viscous flows in the Hele-Shaw cell and other growth processes of Laplacian type. The analytical methods used involve the technique of boundary value problems in two dimensions and elements of the potential theory.

Comments: 20 pages, 2 figures, a contribution to the Oxford Handbook of Random Matrix Theory

Categories: math-ph, math.MP

Keywords: random matrices, laplacian growth, boundary value problems, eigenvalues, complex plane

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