Abstract:
Motivated by biological transport phenomena that involve the
motion of interacting molecular motors along linear filaments, we developed a
theoretical framework to analyze the dynamics of interacting oligomers (extended
size particles) on one-dimensional lattices. Our method extends the asymmetric
simple exclusion processes for interacting monomers to particles of arbitrary
size, and it utilizes cluster mean-field calculations supplemented by extensive
Monte Carlo computer simulations. Interactions between particles are accounted
for by a thermodynamically consistent method that views the formation and
breaking bonds between particles as a chemical process. The dynamics of the
system are analyzed for both periodic and open boundary conditions. It is
found that the nature of the current-density relation depends on the strength
of interactions, on the size of oligomers and on the way interactions influence
particles transition rates. Stationary phase diagram is also fully evaluated, and
it is shown how the dynamic properties depend on the interactions and on the
sizes of the particles. To explain the dynamic behavior of the system particles
density correlations are explicitly analyzed for dierent ranges of parameters.
Theoretical calculations generally agree well with the results from the computer simulations, suggesting that our method correctly describes the main features of
the molecular mechanisms of the transport of interacting oligomers.
