Rank probabilities for real random N× N× 2 tensors

Abstract

We prove that the probability PN for a real random Gaussian N× N× 2 tensor to be of real rank N is PN=(((N+1)/2))N/G(N+1), where (x), G(x) denote the gamma and Barnes G-functions respectively. This is a rational number for N odd and a rational number multiplied by πN/2 for N even. The probability to be of rank N+1 is 1-PN. The proof makes use of recent results on the probability of having k real generalized eigenvalues for real random Gaussian N× N matrices. We also prove that PN= (N2/4) (e/4)+( N-1)/12-ζ '(-1)+ O(1/N) for large N, where ζ is the Riemann zeta function.