What is the probability that a large random matrix has no real eigenvalues?

Abstract

We study the large-n limit of the probability p2n,2k that a random 2n× 2n matrix sampled from the real Ginibre ensemble has 2k real eigenvalues. We prove that, n→ ∞ 12n p2n,2k=n→ ∞ 12n p2n,0= -12πζ(32), where ζ is the Riemann zeta-function. Moreover, for any sequence of non-negative integers (kn)n≥ 1, n→ ∞ 12n p2n,2kn=-12πζ(32), provided n→ ∞ (n-1/2(n)) kn=0.