Probability that product of real random matrices have all eigenvalues real tend to 1
Abstract
In this article we consider products of real random matrices with fixed size. Let A1,A2, … be i.i.d k × k real matrices, whose entries are independent and identically distributed from probability measure μ. Let Xn = A1A2… An. Then it is conjectured that P(Xn has all real eigenvalues) → 1 as n → ∞. We show that the conjecture is true when μ has an atom.
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