Source:http://linkedlifedata.com/resource/pubmed/id/11580429
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| Predicate | Object |
|---|---|
| rdf:type | |
| lifeskim:mentions | |
| pubmed:issue |
3 Pt 2
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| pubmed:dateCreated |
2001-10-2
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| pubmed:abstractText |
Long-wavelength instabilities of steady patterns, spatially periodic in three dimensions, are studied. All potentially stable patterns with the symmetries of the simple-, face-centered- and body-centered-cubic lattices are considered. The results generalize the well-known Eckhaus, zigzag, and skew-varicose instabilities to three-dimensional patterns and are applied to two-species reaction-diffusion equations modeling the Turing instability.
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| pubmed:language |
eng
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| pubmed:journal | |
| pubmed:status |
PubMed-not-MEDLINE
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| pubmed:month |
Sep
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| pubmed:issn |
1539-3755
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| pubmed:author | |
| pubmed:issnType |
Print
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| pubmed:volume |
64
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| pubmed:owner |
NLM
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| pubmed:authorsComplete |
Y
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| pubmed:pagination |
036214
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| pubmed:year |
2001
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| pubmed:articleTitle |
Long-wavelength instabilities of three-dimensional patterns.
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| pubmed:affiliation |
Department of Physics, University of California, Berkeley, California 94720, USA. timcall@math.lsa.umich.edu
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| pubmed:publicationType |
Journal Article
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