Scale-free center-of-mass displacement correlations in dense polymer solutions and melts without topological constraints and momentum conservation: A bond-fluctuation model study

Abstract

By Monte Carlo simulations of a variant of the bond-fluctuation model without topological constraints we examine the center-of-mass (COM) dynamics of polymer melts in d=3 dimensions. Our analysis focuses on the COM displacement correlation function (t) ≈ ∂t2 (t)/2, measuring the curvature of the COM mean-square displacement (t). We demonstrate that (t) ≈ -(/)2 (/) \ f(x=t/) with N being the chain length (16 N 8192), N1/2 the typical chain size, N2 the longest chain relaxation time, the monomer density, ≈ N/d the self-density and f(x) a universal function decaying asymptotically as f(x) x-ω with ω = (d+2) × α where α = 1/4 for x 1 and α = 1/2 for x 1. We argue that the algebraic decay N (t) - t-5/4 for t results from an interplay of chain connectivity and melt incompressibility giving rise to the correlated motion of chains and subchains.