1. Identity statement | |
Reference Type | Journal Article |
Site | mtc-m21d.sid.inpe.br |
Holder Code | isadg {BR SPINPE} ibi 8JMKD3MGPCW/3DT298S |
Identifier | 8JMKD3MGP3W34T/48APBMH |
Repository | sid.inpe.br/mtc-m21d/2023/01.04.14.13 (restricted access) |
Last Update | 2023:03.02.11.24.11 (UTC) simone |
Metadata Repository | sid.inpe.br/mtc-m21d/2023/01.04.14.13.32 |
Metadata Last Update | 2024:01.02.17.16.38 (UTC) administrator |
DOI | 10.1016/j.cnsns.2022.106955 |
ISSN | 1007-5704 |
Citation Key | WerkhausenLopeHey:2023:GeInDy |
Title | Geometric integration and dynamic properties |
Year | 2023 |
Month | Feb. |
Access Date | 2024, May 17 |
Type of Work | journal article |
Secondary Type | PRE PI |
Number of Files | 1 |
Size | 3144 KiB |
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2. Context | |
Author | 1 Werkhausen, Andrei Dalvan 2 Lopes, Igor M. L. 3 Hey, Heyder |
Resume Identifier | 1 2 3 8JMKD3MGP5W/3C9JHCF |
Group | 1 COMIT-CGIP-INPE-MCTI-GOV-BR 2 3 COPDT-CGIP-INPE-MCTI-GOV-BR |
Affiliation | 1 Instituto Nacional de Pesquisas Espaciais (INPE) 2 3 Instituto Nacional de Pesquisas Espaciais (INPE) |
Author e-Mail Address | 1 andrei.dalvan@inpe.br 2 igor.lopes@inpe.br 3 heyder.hey@inpe.br |
Journal | Communications in Nonlinear Science and Numerical Simulation |
Volume | 117 |
Pages | e106955 |
Secondary Mark | A1_INTERDISCIPLINAR A1_ENGENHARIAS_III A2_ENGENHARIAS_IV A2_ENGENHARIAS_I A2_CIÊNCIA_DE_ALIMENTOS B1_ASTRONOMIA_/_FÍSICA B2_CIÊNCIA_DA_COMPUTAÇÃO B3_MATEMÁTICA_/_PROBABILIDADE_E_ESTATÍSTICA |
History (UTC) | 2023-01-04 14:16:49 :: simone -> administrator :: 2023 2023-01-19 20:28:26 :: administrator -> simone :: 2023 2023-03-02 11:24:11 :: simone -> administrator :: 2023 2024-01-02 17:16:38 :: administrator -> simone :: 2023 |
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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 |
Version Type | publisher |
Keywords | Chaos Geometric numeric integration Lie groups Symmetry |
Abstract | This paper reviews the Lie Group's usage and applications in numerical methods for ordinary differential equations. We present comparisons between the midpoint symplectic and the usual RungeKutta methods for distinct dynamical behaviors ranging from integrable to chaotic regimes. Simulation results show that the first has better precision in the regular region of the phase space, according to a statistical indicator defined in this work. Close to the homoclinic crossing, this performance degrades sharply. |
Area | ETES |
Arrangement | urlib.net > BDMCI > Fonds > Produção a partir de 2021 > CGIP > Geometric integration and... |
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 | 1-s2.0-S1007570422004427-main.pdf |
User Group | simone |
Reader Group | administrator simone |
Visibility | shown |
Read Permission | deny from all and allow from 150.163 |
Update Permission | not transferred |
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5. Allied materials | |
Next Higher Units | 8JMKD3MGPCW/46KUES5 |
Citing Item List | sid.inpe.br/bibdigital/2022/04.03.23.11 3 sid.inpe.br/mtc-m21/2012/07.13.14.49.52 1 |
Dissemination | WEBSCI |
Host Collection | urlib.net/www/2021/06.04.03.40 |
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6. Notes | |
Empty Fields | alternatejournal archivingpolicy archivist callnumber copyholder copyright creatorhistory descriptionlevel e-mailaddress format isbn label lineage mark mirrorrepository nextedition notes number orcid parameterlist parentrepositories previousedition previouslowerunit progress project rightsholder schedulinginformation secondarydate secondarykey session shorttitle sponsor subject tertiarymark tertiarytype url |
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7. Description control | |
e-Mail (login) | simone |
update | |
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