Dynamics of a Polymer in the Presence of Permeable Membranes
Abstract
We study the diffusion of a linear polymer in the presence of permeable membranes without excluded volume interactions, using scaling theory and Monte Carlo simulations. We find that the average time it takes for a chain with polymerization index~N to cross a single isolated membrane varies with~N as~% N5/2, giving its permeability proportional to~N2. When the membranes are stacked with uniform spacing~d in the unit of the monomer size, the dynamics of a polymer is shown to have three different regimes. In the limit of small~d N1/2, the chain diffuses through reptation and D N-2. When d is comparable to~N1/2 the diffusion coefficients parallel and perpendicular to the membranes become different from each other. While the diffusion becomes Rouse-like, i.e.~D N-1, in the parallel direction, the motion in the perpendicular direction is still hindered by the two-dimensional networks. The diffusion eventually becomes isotropic and Rouse-like for large~d N.
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