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Autores principales: Klobusicky, Joseph, Onat, Elif, Konstantinou, Vasilios
Formato: Preprint
Publicado: 2024
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Acceso en línea:https://arxiv.org/abs/2407.20858
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author Klobusicky, Joseph
Onat, Elif
Konstantinou, Vasilios
author_facet Klobusicky, Joseph
Onat, Elif
Konstantinou, Vasilios
contents We conduct experiments on a class of two-dimensional semiwet foams generated through compressing a three-dimensional soap foam between two glass plates. To induce a spatially uniform rupturing process on foam boundaries, an additional plate is heated and placed on top of the unheated plates. For 30 separate foam samples, we record network statistics related to cell side numbers and areas as the foam coarsens over a half-minute. We find that the Aboav law and a quadratic Lewis Law, two commonly used relations between network topology and geometry, hold well for preheated foams. To track how well these laws are maintained as the foam ages, we introduce metrics for measuring a foam's disorder over time and build simple autonomous models for these metrics. While the quadratic Lewis Law is found to hold well throughout the rupture process, the Aboav law breaks down rapidly when the Gini coefficient, used for measuring disparity of cell areas, is approximately 0.8.
format Preprint
id arxiv_https___arxiv_org_abs_2407_20858
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Planar network statistics for two-dimensional rupturing foams
Klobusicky, Joseph
Onat, Elif
Konstantinou, Vasilios
Soft Condensed Matter
We conduct experiments on a class of two-dimensional semiwet foams generated through compressing a three-dimensional soap foam between two glass plates. To induce a spatially uniform rupturing process on foam boundaries, an additional plate is heated and placed on top of the unheated plates. For 30 separate foam samples, we record network statistics related to cell side numbers and areas as the foam coarsens over a half-minute. We find that the Aboav law and a quadratic Lewis Law, two commonly used relations between network topology and geometry, hold well for preheated foams. To track how well these laws are maintained as the foam ages, we introduce metrics for measuring a foam's disorder over time and build simple autonomous models for these metrics. While the quadratic Lewis Law is found to hold well throughout the rupture process, the Aboav law breaks down rapidly when the Gini coefficient, used for measuring disparity of cell areas, is approximately 0.8.
title Planar network statistics for two-dimensional rupturing foams
topic Soft Condensed Matter
url https://arxiv.org/abs/2407.20858