Wiener densities for the Airy line ensemble

Abstract

The parabolic Airy line ensemble A is a central limit object in the KPZ universality class and related areas. On any compact set K = \1, …, k\ × [a, a + t], the law of the recentered ensemble A - A(a) has a density XK with respect to the law of k independent Brownian motions. We show that XK(f) = (-S(f) + o(S(f))) where S is an explicit, tractable, non-negative function of f. We use this formula to show that XK is bounded above by a K-dependent constant, give a sharp estimate on the size of the set where XK < ε as ε 0, and prove a large deviation principle for A. We also give density estimates that take into account the relative positions of the Airy lines, and prove sharp two-point tail bounds that are stronger than those for Brownian motion. These estimates are a key input in the classification of geodesic networks in the directed landscape. The paper is essentially self-contained, requiring only tail bounds on the Airy point process and the Brownian Gibbs property as inputs.