Limit laws for the energy of a charged polymer

Abstract

In this paper we obtain the central limit theorems, moderate deviations and the laws of the iterated logarithm for the energy \[Hn=Σ1 j<k nωjωk1\Sj=Sk\\] of the polymer \S1,...,Sn\ equipped with random electrical charges \ω1,...,ωn\. Our approach is based on comparison of the moments between Hn and the self-intersection local time \[Qn=Σ1 j<k n1\Sj=Sk\\] run by the d-dimensional random walk \Sk\. As partially needed for our main objective and partially motivated by their independent interest, the central limit theorems and exponential integrability for Qn are also investigated in the case d3.