Lyapunov exponents of the half-line SHE

Abstract

We consider the half-line stochastic heat equation (SHE) with Robin boundary parameter A = -12. Under narrow wedge initial condition, we compute every positive (including non-integer) Lyapunov exponents of the half-line SHE. As a consequence, we prove a large deviation principle for the upper tail of the half-line KPZ equation under Neumann boundary parameter A = -12 with rate function +hf (s) = 23 s32. This confirms the prediction of [Krajenbrink and Le Doussal 2018] and [Meerson, Vilenkin 2018] for the upper tail exponent of the half-line KPZ equation.