Singularity of random symmetric matrices revisited
引用次数: 7
Abstract
Let $M_n$ be drawn uniformly from all $\pm 1$ symmetric $n \times n$ matrices. We show that the probability that $M_n$ is singular is at most $\exp(-c(n\log n)^{1/2})$, which represents a natural barrier in recent approaches to this problem. In addition to improving on the best-known previous bound of Campos, Mattos, Morris and Morrison of $\exp(-c n^{1/2})$ on the singularity probability, our method is different and considerably simpler.再论随机对称矩阵的奇异性
设$M_n$从所有的$\pm 1$对称的$n \times n$矩阵中均匀地画出来。我们证明$M_n$是奇异的概率最多是$\exp(-c(n\log n)^{1/2})$,这代表了在最近解决这个问题的方法中的一个自然障碍。除了改进了最著名的Campos, Mattos, Morris和Morrison ($\exp(-c n^{1/2})$)关于奇点概率的上界之外,我们的方法是不同的,而且简单得多。
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