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Seminar on Stochastics
February 18, 2011 15:30, St. Petersburg, PDMI, room 106 (nab. r. Fontanki, 27)
 


Matrix integrals and gluing of polygons

N. V. Alekseev

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Abstract: We are interested in the number $T(k,g)$ of ways to glue pairwise all the edges of a $2k$-gon so as to produce a surface of a given genus $g$. For example, there is only one way to obtain a torus by gluing opposite sides of a square, and so $T(2,1)=1$. Spectral distribution moments for some random matrices ensembles can be expressed in terms of numbers $T(k,g)$. For example, if $H$ is a square $N\times N$ Hermitian Gaussian matrix, then
$$ \mathbf E\, \operatorname{Tr}H^{2k}=N^{k+1}\sum_{g=0}^{[k/2]} T(k,g)\frac{1}{N^{2g}}. $$

We discuss the connection between random matrices and gluings of polygons. Also we discuss Harer's and Zagier's theorem about how to compute the number $T(k,g)$.
 
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