The simplest model of polymer crystal exhibiting polymorphism
| Autor: | Zubova, Elena A., Savin, Alexander V., Balabaev, Nikolay K. |
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| Rok vydání: | 2011 |
| Předmět: | |
| Druh dokumentu: | Working Paper |
| Popis: | Almost all the polymer crystals have several polymorphic modifications. Their structure and existence conditions, as well as transitions between them are not understood even in the case of the 'model' polymer polyethylene (PE). For analysis of polymorphism in polymer crystals, we consider the simplest possible model of polymer chain: an extended flat zigzag made of 'united' atoms (replacing CH2-groups in PE chain); the united atoms belonging to different zigzags interact via Lennard-Jones potential. Analysis of potential of interaction between such zigzags allowed to predict the structure of five possible equilibrium lattices in polymer crystal built out of such zigzags. Molecular dynamics simulation of the crystal built out of flexible zigzags showed that, depending on model parameters (dimensions of the zigzag and equilibrium distance of Lennard-Jones potential), one to three of these lattices are stable in bulk at low temperatures. We have determined the model parameters at which the existing stable lattices are analogous to the ones observed in real PE and linear alkanes. The triclinic lattice has the lowest potential energy, then follows the monoclinic lattice, and the orthorhombic lattice has the highest energy, exactly as in full atomic (with hydrogens) molecular dynamics models. Comment: 7 pages, 5 figures |
| Databáze: | arXiv |
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