Directed polymer in a random medium of dimension 1+3 : multifractal properties at the localization/delocalization transition

Abstract

We consider the model of the directed polymer in a random medium of dimension 1+3, and investigate its multifractal properties at the localization/delocalization transition. In close analogy with models of the quantum Anderson localization transition, where the multifractality of critical wavefunctions is well established, we analyse the statistics of the position weights wL( r) of the end-point of the polymer of length L via the moments Yq(L) = Σ r [wL( r)]q. We measure the generalized exponents τ(q) and τ(q) governing the decay of the typical values Ytypq(L) = e Yq(L) L- τ(q) and disorder-averaged values Yq(L) L- τ(q) respectively. To understand the difference between these exponents, τ(q) ≠ τ(q) above some threshold q>qc 2, we compute the probability distributions of y=Yq(L)/Ytypq(L) over the samples : we find that these distributions becomes scale invariant with a power-law tail 1/y1+xq. These results thus correspond to the Ever-Mirlin scenario [Phys. Rev. Lett. 84, 3690 (2000)] for the statistics of Inverse Participation Ratios at the Anderson localization transitions. Finally, the finite-size scaling analysis in the critical region yields the correlation length exponent 2.

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