Recently, we have classified Hermitian random matrix ensembles that are invariant under the conjugate action of the unitary group and stable with respect to matrix addition. Apart from a scaling and a shift, the whole information of such an ensemble is encoded in the stability exponent determining the ``heaviness'' of the tail and the spectral measure that describes the anisotropy of the probability distribution. In the present work, we address the question how these ensembles can be generated by the knowledge of the latter two quantities. We consider a sum of a specific construction of identically and independently distributed random matrices that are based on Haar distributed unitary matrices and a stable random vectors. For this construction, we derive the rate of convergence in the supremums norm and show that this rate is optimal in the class of all stable invariant random matrices for a fixed stability exponent. As a consequence we also give the rate of convergence in the total variation distance.
翻译:最近,我们已经对在单一组群的共和动作下变化不定的Hermitian随机矩阵组合进行了分类,在矩阵添加方面保持稳定。除了缩放和转换外,这种组合的全部信息被编码在稳定指数中,确定尾巴的“重度”和描述概率分布动脉的光谱测量值。在目前的工作中,我们讨论了这些组合如何通过了解后两个数量产生的问题。我们考虑的是以哈尔分布的单一矩阵和稳定的随机矢量为基础的相同和独立分布随机矩阵的具体构造的总和。我们从这一构造中得出了超模规范的趋同率,并表明这一比率对于固定稳定性的不稳定随机矩阵来说是最佳的。因此,我们还给出了完全变异距离的趋同率。