Why should the eigenvalues of random matrices reflect zeta function zeroes?
This article is related to the question.
Is this a particular property of $2$-dimensional objects? Could random vectors also model the "universality phenomena" -- globally random distribution of zeroes combined with local repulsion of zeroes?
Is this because matrices eigenvectors are orthogonal to each other, the orthogonality modeling the repulsion / mutual exclusion of the energy states of real systems? Are there any instances where CP decompositions of "random tensors" model physical systems ? Why matrices ?