Spectral Collapse Under Geometric Alignment of Extreme Events

Abstract

Let Qn = Bn + Jn be the quadratic covariation matrix of a high-dimensional semimartingale, where Jn is the jump component and Bn is the diffusion component. We prove that spectral collapse occurs -- meaning the ratio of the leading eigenvalue to the trace converges to 1 and the effective rank converges to 1 -- if and only if the jump directions are geometrically aligned in a weighted sense and the background diffusion is asymptotically negligible. The proof separates into two steps: geometric alignment of jump directions forces spectral concentration of Jn; background negligibility then propagates this to the full system. We extend to the stochastic setting and prove convergence in probability under natural conditions on the jump process. The framework gives a scalar diagnostic for detecting when a high-dimensional system is dominated by extreme events.