Short- and long-time path tightness of the continuum directed random polymer

Abstract

We consider the point-to-point continuum directed random polymer (CDRP) model that arises as a scaling limit from 1+1 dimensional directed polymers in the intermediate disorder regime. We show that the annealed law of a point-to-point CDRP of length t converges to the Brownian bridge under diffusive scaling when t 0. In case that t is large, we show that the transversal fluctuations of point-to-point CDRP are governed by the 2/3 exponent. More precisely, as t tends to infinity, we prove tightness of the annealed path measures of point-to-point CDRP of length t upon scaling the length by t and fluctuations of paths by t2/3. The 2/3 exponent is tight such that the one-point distribution of the rescaled paths converges to the geodesics of the directed landscape. This point-wise convergence can be enhanced to process-level modulo a conjecture. Our short and long-time tightness results also extend to point-to-line CDRP. In the course of proving our main results, we establish quantitative versions of quenched modulus of continuity estimates for long-time CDRP which are of independent interest.

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