Fluctuations of a long, semiflexible polymer in a narrow channel

Abstract

We consider an inextensible, semiflexible polymer or worm-like chain, with persistence length P and contour length L, fluctuating in a cylindrical channel of diameter D. In the regime D P L, corresponding to a long, tightly confined polymer, the average length of the channel <R> occupied by the polymer and the mean square deviation from the average vary as <R>=[1-α(D/P)2/3]L and < R 2>=β(D2/P)L, respectively, where α and β are dimensionless amplitudes. In earlier work we determined α and the analogous amplitude α for a channel with a rectangular cross section from simulations of very long chains. In this paper we estimate β and β from the simulations. The estimates are compared with exact analytical results for a semiflexible polymer confined in the transverse direction by a parabolic potential instead of a channel and with a recent experiment. For the parabolic confining potential we also obtain a simple analytic result for the distribution of R or radial distribution function, which is asymptotically exact for large L and has the skewed shape seen experimentally.