Issue 35, 2022

The growth simulation of pine-needle like structure with diffusion-limited aggregation and oriented attachment

Abstract

A growth model combined with diffusion-limited aggregation (DLA) and oriented attachment (OA) is developed for deducing quantitative understanding of the growth process of pine-needle like structures. We define the completely random parameters for describing the realistic Brownian motion in DLA. The results indicate that the cluster by DLA changes from random branches to regular needles by the introduction of OA. And the cluster of DLA and OA has a fractal dimensionality of about 1.0 during the whole growth process. The maximum length of needels (Lmax) depends on the number of particles (Np). They satisfy the relation Lmax = aNpb (a and b are constant) over the whole range. The model has also been used to describe the formation of needles on a line, plane and sphere. The growth of needles has obvious steric hindrance from the outer needles. In particular, only one needle grows in the later period in the plane.

Graphical abstract: The growth simulation of pine-needle like structure with diffusion-limited aggregation and oriented attachment

Supplementary files

Article information

Article type
Paper
Submitted
13 Jun 2022
Accepted
08 Aug 2022
First published
15 Aug 2022
This article is Open Access
Creative Commons BY license

RSC Adv., 2022,12, 22946-22950

The growth simulation of pine-needle like structure with diffusion-limited aggregation and oriented attachment

Z. Xia, RSC Adv., 2022, 12, 22946 DOI: 10.1039/D2RA03649E

This article is licensed under a Creative Commons Attribution 3.0 Unported Licence. You can use material from this article in other publications without requesting further permissions from the RSC, provided that the correct acknowledgement is given.

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