Elasticity of Gaussian and nearly-Gaussian phantom networks

A. Coniglio; D. B. Gingold; D. C. Wallace; D. J. Bergman; D. R. Squire; D. Stauffer; F. Carciun; F. Devreux; H. M. James; J. G. Zabolitzki; J. H. Weiner; L. R. G. Treloar; M. A. V. Axelox; M. Adam; M. Born; M. E. Cates; M. Plischke; M. Plischke; O. Farago; Oded Farago; P. G. de Gennes; P. G. de Gennes; P. Grassberger; R. Everears; R. H. Colby; R. T. Deam; S. Alexander; S. Alexander; S. Arbabi; S. Arbabi; S. Feng; S. Feng; Y. Kantor; Y. Kantor; Y. Kantor; Yacov Kantor; Z. Zhou

research

Elasticity of Gaussian and nearly-Gaussian phantom networks

Authors: A. Coniglio
D. B. Gingold
D. C. Wallace
D. J. Bergman
D. R. Squire
D. Stauffer
F. Carciun
F. Devreux
H. M. James
J. G. Zabolitzki
J. H. Weiner
L. R. G. Treloar
M. A. V. Axelox
M. Adam
M. Born
M. E. Cates
M. Plischke
M. Plischke
O. Farago
Oded Farago
P. G. de Gennes
P. G. de Gennes
P. Grassberger
R. Everears
R. H. Colby
R. T. Deam
S. Alexander
S. Alexander
S. Arbabi
S. Arbabi
S. Feng
S. Feng
Y. Kantor
Y. Kantor
Y. Kantor
Yacov Kantor
Z. Zhou
Publication date: 1 June 2000
Publisher: 'American Physical Society (APS)'
Doi

Abstract

We study the elastic properties of phantom networks of Gaussian and nearly-Gaussian springs. We show that the stress tensor of a Gaussian network coincides with the conductivity tensor of an equivalent resistor network, while its elastic constants vanish. We use a perturbation theory to analyze the elastic behavior of networks of slightly non-Gaussian springs. We show that the elastic constants of phantom percolation networks of nearly-Gaussian springs have a power low dependence on the distance of the system from the percolation threshold, and derive bounds on the exponents.Comment: submitted to Phys. Rev. E, 10 pages, 1 figur

Similar works

Full text

Available Versions

Crossref

Last time updated on 26/03/2019