1. Identity statement | |
Reference Type | Journal Article |
Site | mtc-m16d.sid.inpe.br |
Holder Code | isadg {BR SPINPE} ibi 8JMKD3MGPCW/3DT298S |
Identifier | 8JMKD3MGP7W/38Q5K3L |
Repository | sid.inpe.br/mtc-m19/2010/12.16.15.12 (restricted access) |
Last Update | 2010:12.16.15.20.16 (UTC) administrator |
Metadata Repository | sid.inpe.br/mtc-m19/2010/12.16.15.12.56 |
Metadata Last Update | 2018:06.05.04.34.57 (UTC) administrator |
Secondary Key | INPE--PRE/ |
DOI | 10.1016/j.asr.2008.08.025 |
ISSN | 0273-1177 |
Citation Key | HanShuYangChia:2010:PoHaSy |
Title | Polynomial Hamiltonian systems with a nilpotent critical point |
Year | 2010 |
Month | Aug. |
Access Date | 2024, Apr. 27 |
Secondary Type | PRE PI |
Number of Files | 1 |
Size | 415 KiB |
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2. Context | |
Author | 1 Han, Maoan 2 Shu, Chenggang 3 Yang, Junmin 4 Chian, Abraham C. -L. ) |
Group | 1 2 3 4 DGE-CEA-INPE-MCT-BR |
Affiliation | 1 Shanghai Normal Univ, Dept Math, Shanghai 200234, Peoples R China 2 Shanghai Normal Univ, Key Lab Astrophys, Shanghai 200234, Peoples R China 3 Shanghai Normal Univ, Dept Math, Shanghai 200234, Peoples R China 4 Instituto Nacional de Pesquisas Espaciais (INPE) |
Journal | Advances in Space Research |
Volume | 46 |
Number | 4 |
Pages | 521-525 |
Secondary Mark | B4_ASTRONOMIA_/_FÍSICA B3_CIÊNCIAS_BIOLÓGICAS_I B1_ENGENHARIAS_III B1_ENGENHARIAS_IV B1_GEOCIÊNCIAS B1_INTERDISCIPLINAR |
History (UTC) | 2011-05-23 04:01:14 :: marciana -> administrator :: 2010 2012-07-15 02:56:50 :: administrator -> banon :: 2010 2013-02-19 14:10:50 :: banon -> administrator :: 2010 2018-06-05 04:34:57 :: administrator -> marciana :: 2010 |
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3. Content and structure | |
Is the master or a copy? | is the master |
Content Stage | completed |
Transferable | 1 |
Content Type | External Contribution |
Keywords | Hamiltonian systems Space physics Astrophysics Nilpotent critical point Mathematics LIMIT-CYCLES INTEGRABLE SYSTEMS VECTOR-FIELDS BIFURCATIONS CYCLICITY NUMBER |
Abstract | The study of Hamiltonian systems is important for space physics and astrophysics. In this paper, we study local behavior of an isolated nilpotent critical point for polynomial Hamiltonian systems. We prove that there are exact three cases: a center, a cusp or a saddle. Then for quadratic and cubic Hamiltonian systems we obtain necessary and sufficient conditions for a nilpotent critical point to be a center, a cusp or a saddle. We also give phase portraits for these systems under some conditions of symmetry. |
Area | CEA |
Arrangement | urlib.net > BDMCI > Fonds > Produção anterior à 2021 > DIDGE > Polynomial Hamiltonian systems... |
doc Directory Content | access |
source Directory Content | there are no files |
agreement Directory Content | |
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4. Conditions of access and use | |
Language | en |
Target File | chian.pdf |
User Group | administrator banon marciana |
Visibility | shown |
Archiving Policy | denypublisher denyfinaldraft24 |
Read Permission | deny from all and allow from 150.163 |
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5. Allied materials | |
Mirror Repository | sid.inpe.br/mtc-m19@80/2009/08.21.17.02.53 |
Next Higher Units | 8JMKD3MGPCW/3EU29DP |
Dissemination | WEBSCI; PORTALCAPES; MGA; COMPENDEX. |
Host Collection | sid.inpe.br/mtc-m19@80/2009/08.21.17.02 |
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6. Notes | |
Empty Fields | alternatejournal archivist callnumber copyholder copyright creatorhistory descriptionlevel documentstage e-mailaddress electronicmailaddress format isbn label lineage mark nextedition notes orcid parameterlist parentrepositories previousedition previouslowerunit progress project readergroup resumeid rightsholder schedulinginformation secondarydate session shorttitle sponsor subject tertiarymark tertiarytype typeofwork url versiontype |
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7. Description control | |
e-Mail (login) | marciana |
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