| ID | 30217 |
| FullText URL | |
| Author | |
| Abstract | A transfer-matrix simulation scheme for the three-dimensional (d=3) bond percolation is presented. Our scheme is based on Novotny's transfer-matrix formalism, which enables us to consider arbitrary (integral) number of sites N constituting a unit of the transfer-matrix slice even for d=3. Such an arbitrariness allows us to perform systematic finite-size-scaling analysis of the criticality at the percolation threshold. Diagonalizing the transfer matrix for N=4,5,...,10, we obtain an estimate for the correlation-length critical exponent nu=0.81(5). |
| Keywords | size-scaling analysis
isingmodel
potts-model
dimensions
|
| Note | Digital Object Identifer:10.1103/PhysRevE.73.016114
Published with permission from the copyright holder. This is the institute's copy, as published in Physical Review E, January 2006, Volume 73, Issue 1, Pages 6. Publisher URL:http://dx.doi.org/10.1103/PhysRevE.73.016114 Direct access to Thomson Web of Science record Copyright © 2006 The American Physical Society. All rights reserved. |
| Published Date | 2006-1
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| Publication Title |
Physical Review E
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| Volume | volume73
|
| Issue | issue1
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| Content Type |
Journal Article
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| language |
English
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| Refereed |
True
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| DOI | |
| Web of Science KeyUT | |
| Submission Path | electricity_and_magnetism/179
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