Knots in Macromolecules in Constraint Space
Abstract
We find a power law for the number of knot-monomers with an exponent 0.39 0.13 in agreement with previous simulations. For the average size of a knot we also obtain a power law Nm=2.56· N0.200.04. We further present data on the average number of knots given a certain chain length and confirm a power law behaviour for the number of knot-monomers. Furthermore we study the average crossing number for random and self-avoiding walks as well as for a model polymer with and without geometric constraints. The data confirms the aN N + bN law in the case of without excluded volume and determines the constants a and b for various cases. For chains with excluded volume the data for chains up to N=1500 is consistent with aN N + bN rather than the proposed N4/3 law. Nevertheless our fits show that the N4/3 law is a suitable approximation.
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