有限域上随机矩阵的秩分布

Random Struct. Algorithms Pub Date : 2000-10-10 DOI:10.1002/1098-2418(200010/12)17:3/4%3C197::AID-RSA2%3E3.0.CO;2-K

C. Cooper

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引用次数: 89

摘要

设M = (mij)是GF(t)上的一个随机n × n矩阵，其中每个矩阵项mij独立地同分布，Pr(mij = 0) = 1 - p(n)， Pr(mij = r) = p(n)/(t - 1)， r 6= 0。若取t≥3，且条件M不存在零行零列，则当p≥(log n + d)/n时，M非奇异的概率趋于ct ~∏∞j=1(1−t−j)，其中d缓慢→−∞。

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On the distribution of rank of a random matrix over a finite field

Let M = (mij) be a random n × n matrix over GF(t) in which each matrix entry mij is independently and identically distributed, with Pr(mij = 0) = 1 − p(n) and Pr(mij = r) = p(n)/(t − 1), r 6= 0. If we choose t ≥ 3, and condition on M having no zero rows or columns, then the probability that M is non-singular tends to ct ∼ ∏∞ j=1(1 − t−j) provided p ≥ (log n + d)/n, where d → −∞ slowly.

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Random Struct. Algorithms

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