Limit joint distributions of SYK Models with partial interactions, Mixed q-Gaussian Models and Asymptotic -freeness

Abstract

We study the joint distribution of SYK Hamiltonians for different systems with specified overlaps. We show that, in the large-system limit, their joint distribution converges in distribution to a mixed q-Gaussian system. We explain that the graph product of diffusive abelian von Neumann algebras is isomorphic to a W*-probability space generated by the corresponding -freely independent random variables with semicircular laws which form a special case of mixed q-Gaussian systems that can be approximated by our SYK Hamiltonian models. Thus, we obtain a random model for asymptotic -freeness.