The Hall–Petch effect as a manifestation of the general size effect
The experimental evidence for the Hall–Petch dependence of strength on the inverse square-root of grain size is reviewed critically. Both the classic data and more recent results are considered. While the data are traditionally fitted to the inverse square-root dependence, they also fit well to many...
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| Veröffentlicht in: | Proceedings of the Royal Society. A, Mathematical, physical, and engineering sciences Mathematical, physical, and engineering sciences, 2016-06, Vol.472 (2190), p.20150890-20150890 |
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| container_end_page | 20150890 |
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| container_issue | 2190 |
| container_start_page | 20150890 |
| container_title | Proceedings of the Royal Society. A, Mathematical, physical, and engineering sciences |
| container_volume | 472 |
| creator | Li, Y. Bushby, A. J. Dunstan, D. J. |
| description | The experimental evidence for the Hall–Petch dependence of strength on the inverse square-root of grain size is reviewed critically. Both the classic data and more recent results are considered. While the data are traditionally fitted to the inverse square-root dependence, they also fit well to many other functions, both power law and non-power law. There have been difficulties, recognized for half-a-century, in the inverse square-root expression. It is now explained as an artefact of faulty data analysis. A Bayesian meta-analysis shows that the data strongly support the simple inverse or lnd/d expressions. Since these expressions derive from underlying theory, they are also more readily explicable. It is concluded that the Hall–Petch effect is not to be explained by the variety of theories found in the literature, but is a manifestation of, or to be underlain by the general size effect observed throughout micromechanics, owing to the inverse relationship between the stress required and the space available for dislocation sources to operate. |
| doi_str_mv | 10.1098/rspa.2015.0890 |
| format | Article |
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J. ; Dunstan, D. J.</creator><creatorcontrib>Li, Y. ; Bushby, A. J. ; Dunstan, D. J.</creatorcontrib><description>The experimental evidence for the Hall–Petch dependence of strength on the inverse square-root of grain size is reviewed critically. Both the classic data and more recent results are considered. While the data are traditionally fitted to the inverse square-root dependence, they also fit well to many other functions, both power law and non-power law. There have been difficulties, recognized for half-a-century, in the inverse square-root expression. It is now explained as an artefact of faulty data analysis. A Bayesian meta-analysis shows that the data strongly support the simple inverse or lnd/d expressions. Since these expressions derive from underlying theory, they are also more readily explicable. It is concluded that the Hall–Petch effect is not to be explained by the variety of theories found in the literature, but is a manifestation of, or to be underlain by the general size effect observed throughout micromechanics, owing to the inverse relationship between the stress required and the space available for dislocation sources to operate.</description><identifier>ISSN: 1364-5021</identifier><identifier>EISSN: 1471-2946</identifier><identifier>DOI: 10.1098/rspa.2015.0890</identifier><identifier>PMID: 27436968</identifier><language>eng</language><publisher>England: The Royal Society Publishing</publisher><subject>Dislocations ; Elastic–plastic Material ; Grain Boundaries ; Hall–petch Equation ; Probability And Statistics</subject><ispartof>Proceedings of the Royal Society. 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While the data are traditionally fitted to the inverse square-root dependence, they also fit well to many other functions, both power law and non-power law. There have been difficulties, recognized for half-a-century, in the inverse square-root expression. It is now explained as an artefact of faulty data analysis. A Bayesian meta-analysis shows that the data strongly support the simple inverse or lnd/d expressions. Since these expressions derive from underlying theory, they are also more readily explicable. 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| identifier | ISSN: 1364-5021 |
| ispartof | Proceedings of the Royal Society. A, Mathematical, physical, and engineering sciences, 2016-06, Vol.472 (2190), p.20150890-20150890 |
| issn | 1364-5021 1471-2946 |
| language | eng |
| recordid | cdi_pubmed_primary_27436968 |
| source | Jstor Complete Legacy; Alma/SFX Local Collection; JSTOR Mathematics & Statistics |
| subjects | Dislocations Elastic–plastic Material Grain Boundaries Hall–petch Equation Probability And Statistics |
| title | The Hall–Petch effect as a manifestation of the general size effect |
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