Scaling in three-dimensional linear and ring polymers
- 1 January 1986
- journal article
- research article
- Published by AIP Publishing in The Journal of Chemical Physics
- Vol. 84 (1) , 444-446
- https://doi.org/10.1063/1.450158
Abstract
Bead size effects on the excluded volume of linear and ring polymers are investigated by Brownian dynamics. It is found that the mean dimensions of the chains follow a scaling relation with scaling variable X=N (σ/l)d/φ, where N is the number of units on the chain, σ is the size of the unit, l is the link length, d is the dimension, and φ is the crossover exponent. The scaling law is 〈R2〉/〈R2〉0 or 〈S2〉/〈S2〉0∼X2ν−1 for X→∞ where ν is the critical exponent for the mean dimensions of an isolated polymer chain.Keywords
This publication has 12 references indexed in Scilit:
- Probability of knots in a polymer ringPhysics Letters A, 1982
- Statistics of self-avoiding ring polymersThe Journal of Chemical Physics, 1982
- Monte Carlo renormalization of hard sphere polymer chains in two to five dimensionsZeitschrift für Physik B Condensed Matter, 1981
- Monte Carlo study of freely jointed ring polymers. III. The generation of undistorted perfect ring polymersThe Journal of Chemical Physics, 1981
- Excluded-volume expansion of polymer chains: A Monte Carlo study of the scaling propertiesPhysical Review B, 1980
- Monte Carlo studies on the freely jointed polymer chain with excluded volume interactionThe Journal of Chemical Physics, 1979
- Monte Carlo calculations on off-lattice polymer chains. The influence of variation of the excluded volumeJournal of Physics A: General Physics, 1977
- Monte Carlo studies of the excluded volume problem for polymer chains in the continuum. I. Use of inversely restricted sampling techniquesJournal of Physics A: General Physics, 1975
- The renormalization group in the theory of critical behaviorReviews of Modern Physics, 1974
- Exponents for the excluded volume problem as derived by the Wilson methodPhysics Letters A, 1972