An upper bound of the lower tail of the mass of balls under the critical 2d stochastic heat flow

Abstract

We study the critical two-dimensional stochastic heat flow Zt, recently constructed as the scaling limit of directed polymers in a random environment and as the weak limit of the solution to a mollified stochastic heat equation. Focusing on the mass of balls Zt(Br(0),Br(a)) (a∈ R2, r>0), we establish an upper bound on its lower tail. As a consequence, we prove the integrability of the logarithm of Zt(Br(0),Br(a)) and its strict positivity. These results provide partial answers to open questions concerning the local behavior of Zt.