The scaling limits for Wiener sausages in random environments

Abstract

We consider the statistical mechanics of a random polymer with random walks and disorders in Zd. The walk collects random disorders along the way and gets nothing if it visits the same site twice. In the continuum and weak disorder regime, the partition function as a random variable converges weakly to a Wiener Chaos expansion when the dimension is lower than the critical dimension, which is four. A finite temperature case in one dimension is also discussed. The last case suggests that the end-point behavior of the polymer is t2/3.