Maximal estimates for orthonormal systems of wave equations with sharp regularity

Abstract

We study maximal estimates for the wave equation with orthonormal initial data. In dimension d=3, we establish optimal results with the sharp regularity exponent up to the endpoint. In higher dimensions d 4 and also in d=2, we obtain sharp bounds for the Schatten exponent (summability index) β∈ [2, ∞] when d4, and β∈[1, 2] when d=2, improving upon the previous estimates due to Kinoshita--Ko--Shiraki. Our approach is based on a novel analysis of a key integral arising in the case β=2, which allows us to refine existing techniques and achieve the optimal estimates.