Equilibrium winding angle of a polymer around a bar

Abstract

The winding angle probability distribution of a planar self-avoiding walk has been known exactly since a long time: it has a gaussian shape with a variance growing as <θ2> L. For the three-dimensional case of a walk winding around a bar, the same scaling is suggested, based on a first-order epsilon-expansion. We tested this three-dimensional case by means of Monte Carlo simulations up to length L≈25\,000 and using exact enumeration data for sizes L20. We find that the variance of the winding angle scales as <θ2> ( L)2α, with α=0.75(1). The ratio γ = <θ4>/<θ2>2=3.74(5) is incompatible with the gaussian value γ =3, but consistent with the observation that the tail of the probability distribution function p(θ) is found to decrease slower than a gaussian function. These findings are at odds with the existing first-order ε-expansion results.