Persistence length convergence and universality for the self-avoiding random walk

Please use this identifier to cite or link to this item: http://repositorio.ufla.br/jspui/handle/1/40010

Title:	Persistence length convergence and universality for the self-avoiding random walk
Issue Date:	Jan-2019
Publisher:	IOP Publishing
Citation:	GRANZOTTI, C. R. F. et al. Persistence length convergence and universality for the self-avoiding random walk. Journal of Physics A: Mathematical and Theoretical, [S.l.], Jan. 2019.
Abstract:	In this study, we show the convergence and new properties of persistence length, , for the self-avoiding random walk model (SAW) using Monte Carlo data. We generate high precision estimates of several conformational quantities with a pivot algorithm for the square, hexagonal, triangular, cubic and diamond lattices with path lengths of 103 steps. For each lattice, we accurately estimate the asymptotic limit , which corroborates the convergence of to a constant value, and allows us to check the universality on the curves. Based on the estimates we make an ansatz for dependency with lattice cell and spatial dimension, we also find a new geometric interpretation for the persistence length.
URI:	https://iopscience.iop.org/article/10.1088/1751-8121/aaeeb0 http://repositorio.ufla.br/jspui/handle/1/40010
Appears in Collections:	DEX - Artigos publicados em periódicos DFI - Artigos publicados em periódicos

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