Directed polymer in a random medium of dimension 1+1 and 1+3: weights statistics in the low-temperature phase
Abstract
We consider the low-temperature T<Tc disorder-dominated phase of the directed polymer in a random potentiel in dimension 1+1 (where Tc=∞) and 1+3 (where Tc<∞). To characterize the localization properties of the polymer of length L, we analyse the statistics of the weights wL( r) of the last monomer as follows. We numerically compute the probability distributions P1(w) of the maximal weight wLmax= max r [wL( r)], the probability distribution (Y2) of the parameter Y2(L)= Σ r wL2( r) as well as the average values of the higher order moments Yk(L)= Σ r wLk( r). We find that there exists a temperature Tgap<Tc such that (i) for T<Tgap, the distributions P1(w) and (Y2) present the characteristic Derrida-Flyvbjerg singularities at w=1/n and Y2=1/n for n=1,2... In particular, there exists a temperature-dependent exponent μ(T) that governs the main singularities P1(w) (1-w)μ(T)-1 and (Y2) (1-Y2)μ(T)-1 as well as the power-law decay of the moments Yk(i) 1/kμ(T). The exponent μ(T) grows from the value μ(T=0)=0 up to μ(Tgap) 2. (ii) for Tgap<T<Tc, the distribution P1(w) vanishes at some value w0(T)<1, and accordingly the moments Yk(i) decay exponentially as (w0(T))k in k. The histograms of spatial correlations also display Derrida-Flyvbjerg singularities for T<Tgap. Both below and above Tgap, the study of typical and averaged correlations is in full agreement with the droplet scaling theory.
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