First Order Asymptotics of Matrix Integrals; A Rigorous Approach Towards the Understanding of Matrix Models

Alice Guionnet

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First Order Asymptotics of Matrix Integrals; A Rigorous Approach Towards the Understanding of Matrix Models

机译：矩阵积分的一阶渐近性理解矩阵模型的严格方法

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We investigate the large N limit of spectral measures of matrices which relate to the Gibbs measures of a number of statistical mechanical systems on random graphs. These include the Ising and Potts models on random graphs. For most of these models, we prove that the spectral measures converge almost surely and describe their limit via solutions to an Euler equation for isentropic flow with negative pressure p(ρ)=−3−1π2ρ3.

机译：我们调查了矩阵频谱度量的大N极限，这与随机图上许多统计力学系统的吉布斯度量有关。这些包括随机图上的Ising和Potts模型。对于大多数这些模型，我们证明了频谱量度几乎可以收敛，并通过求解负压p（ρ）= − 3−1 π2ρ3的等熵流的欧拉方程的解来描述其极限。。

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《Communications in Mathematical Physics》 |2004年第3期|527-569|共43页
作者
Alice Guionnet;
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Ecole Normale Superieure de Lyon Unite de Mathematiques pures et appliquees;

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First Order Asymptotics of Matrix Integrals; A Rigorous Approach Towards the Understanding of Matrix Models

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