Spectra of contractions of the Gaussian Orthogonal Tensor Ensemble

Abstract

In this article, we study the spectra of matrix-valued contractions of the Gaussian Orthogonal Tensor Ensemble (GOTE). Let G denote a random tensor of order r and dimension n drawn from the density \[ f(G) (-12r\|G\|2F). \] For w ∈ Sn - 1, the unit-sphere in Rn, we consider the matrix-valued contraction G · w (r - 2) when both r and n go to infinity such that r / n c ∈ [0, ∞]. We obtain semi-circle bulk-limits in all regimes, generalising the works of Goulart et al. (2022); Au and Garza-Vargas (2023); Bonnin (2024) in the fixed-r setting. We also study the edge-spectrum. We obtain a Baik-Ben Arous-P\'ech\'e phase-transition for the largest and the smallest eigenvalues at r = 4, generalising a result of Mukherjee et al. (2024) in the context of adjacency matrices of random hypergraphs. We also show that the extreme eigenvectors of G · w (r - 2) contain non-trivial information about the contraction direction w. Finally, we report some results, in the case r = 4, on mixed contractions G · u v, u, v ∈ Sn - 1. While the total variation distance between the joint distribution of the entries of G · u v and that of G · u u goes to 0 when \|u - v\| = o(n-1), the bulk and the largest eigenvalues of these two matrices have the same limit profile as long as \|u - v\| = o(1). Furthermore, it turns out that there are no outlier eigenvalues in the spectrum of G · u v when u, v = o(1).