Condition Numbers of Gaussian Random Matrices

Abstract

Let Gm × n be an m × n real random matrix whose elements are independent and identically distributed standard normal random variables, and let κ2(Gm × n) be the 2-norm condition number of Gm × n. We prove that, for any m ≥ 2, n ≥ 2 and x ≥ |n-m|+1, κ2(Gm × n) satisfies 12π (c/x)|n-m|+1 < P(κ2(Gm × n) n/(|n-m|+1)> x) < 12π (C/x)|n-m|+1, where 0.245 ≤ c ≤ 2.000 and 5.013 ≤ C ≤ 6.414 are universal positive constants independent of m, n and x. Moreover, for any m ≥ 2 and n ≥ 2, E(κ2(Gm × n)) < n|n-m|+1 + 2.258. A similar pair of results for complex Gaussian random matrices is also established.