WEKO3
アイテム
There is a newer version of this record available.
{"_buckets": {"deposit": "a36d8062-0d1b-46cb-879f-5586c174926e"}, "_deposit": {"id": "5503.1", "owners": [2], "pid": {"revision_id": 0, "type": "depid", "value": "5503.1"}, "status": "published"}, "_oai": {"id": "oai:miyazaki-u.repo.nii.ac.jp:00005503.1", "sets": ["27"]}, "author_link": ["13413", "29679", "13412", "29681", "29683", "29685"], "item_10001_biblio_info_7": {"attribute_name": "書誌情報", "attribute_value_mlt": [{"bibliographicIssueDates": {"bibliographicIssueDate": "2011", "bibliographicIssueDateType": "Issued"}, "bibliographicPageEnd": "I_924", "bibliographicPageStart": "I_915", "bibliographicVolumeNumber": "67(2)", "bibliographic_titles": [{"bibliographic_title": "土木学会論文集 A2"}]}]}, "item_10001_description_5": {"attribute_name": "抄録", "attribute_value_mlt": [{"subitem_description": "This paper presents the dynamic Green\u0027s functions by the use of the stiffness matrix method for layered elastic half space in Cartesian coordinates. From these Green\u0027s functions in Cartesian coordinates, the well known Green\u0027s functions in cylindrical coordinates are derived. The presented Green\u0027s functions in Cartesian coordinates are represented by the two fold Fourier integral, and then the 2 Dimensional Fast Fourier Transform (2DFFT) can be effectively used to calculate the dinamic Green\u0027s functions. To verify numerically the validity of the presented Green\u0027s functions in Cartesian coordinates, the numerical examples of comparison with the well known dynamic Green\u0027s functions of elastic half space in cylindrical coordinates are shown.", "subitem_description_type": "Abstract"}]}, "item_10001_text_25": {"attribute_name": "BIBID", "attribute_value_mlt": [{"subitem_text_value": "TC10167472"}]}, "item_10001_version_type_20": {"attribute_name": "著者版フラグ", "attribute_value_mlt": [{"subitem_version_resource": "http://purl.org/coar/version/c_970fb48d4fbd8a85", "subitem_version_type": "VoR"}]}, "item_creator": {"attribute_name": "著者", "attribute_type": "creator", "attribute_value_mlt": [{"creatorNames": [{"creatorName": "原田, 隆典"}, {"creatorName": "ハラダ, タカノリ", "creatorNameLang": "ja-Kana"}, {"creatorName": "Harada, Takanori", "creatorNameLang": "en"}], "nameIdentifiers": [{"nameIdentifier": "13413", "nameIdentifierScheme": "WEKO"}]}, {"creatorNames": [{"creatorName": "松田, 良介"}, {"creatorName": "マツダ, リョウスケ", "creatorNameLang": "ja-Kana"}], "nameIdentifiers": [{"nameIdentifier": "29679", "nameIdentifierScheme": "WEKO"}]}, {"creatorNames": [{"creatorName": "中村, 真貴"}, {"creatorName": "ナカムラ, マサキ", "creatorNameLang": "ja-Kana"}, {"creatorName": "Nakamura, Masaki", "creatorNameLang": "en"}], "nameIdentifiers": [{"nameIdentifier": "13412", "nameIdentifierScheme": "WEKO"}]}, {"creatorNames": [{"creatorName": "粟田, 勇志"}, {"creatorName": "アワダ, ユウシ", "creatorNameLang": "ja-Kana"}], "nameIdentifiers": [{"nameIdentifier": "29681", "nameIdentifierScheme": "WEKO"}]}, {"creatorNames": [{"creatorName": "Matsuda, Ryosuke", "creatorNameLang": "en"}], "nameIdentifiers": [{"nameIdentifier": "29683", "nameIdentifierScheme": "WEKO"}]}, {"creatorNames": [{"creatorName": "Awada, Yushi", "creatorNameLang": "en"}], "nameIdentifiers": [{"nameIdentifier": "29685", "nameIdentifierScheme": "WEKO"}]}]}, "item_files": {"attribute_name": "ファイル情報", "attribute_type": "file", "attribute_value_mlt": [{"accessrole": "open_date", "date": [{"dateType": "Available", "dateValue": "2020-06-21"}], "displaytype": "detail", "download_preview_message": "", "file_order": 0, "filename": "fuurie_harada_2011.pdf", "filesize": [{"value": "806.6 kB"}], "format": "application/pdf", "future_date_message": "", "is_thumbnail": false, "licensetype": "license_free", "mimetype": "application/pdf", "size": 806600.0, "url": {"url": "https://miyazaki-u.repo.nii.ac.jp/record/5503.1/files/fuurie_harada_2011.pdf"}, "version_id": "4e12d01c-fa11-4a91-981c-226cead1e9ab"}]}, "item_keyword": {"attribute_name": "キーワード", "attribute_value_mlt": [{"subitem_subject": "Dynamic Green\u0027s functions for layered half space, Stiffness matrix method, Cartesian coordinates, Cylindrical coordinates", "subitem_subject_scheme": "Other"}]}, "item_language": {"attribute_name": "言語", "attribute_value_mlt": [{"subitem_language": "jpn"}]}, "item_resource_type": {"attribute_name": "資源タイプ", "attribute_value_mlt": [{"resourcetype": "journal article", "resourceuri": "http://purl.org/coar/resource_type/c_6501"}]}, "item_title": "直交座標系とフーリエ変換を用いた水平成層弾性体の動的グリーン関数", "item_titles": {"attribute_name": "タイトル", "attribute_value_mlt": [{"subitem_title": "直交座標系とフーリエ変換を用いた水平成層弾性体の動的グリーン関数"}, {"subitem_title": "Dynamic Green\u0027s functions for layered media by using 3 dimensional cartesian coordinates and Fourier transfom", "subitem_title_language": "en"}]}, "item_type_id": "10001", "owner": "2", "path": ["27"], "permalink_uri": "http://hdl.handle.net/10458/6605", "pubdate": {"attribute_name": "公開日", "attribute_value": "2020-06-21"}, "publish_date": "2020-06-21", "publish_status": "0", "recid": "5503.1", "relation": {}, "relation_version_is_last": true, "title": ["直交座標系とフーリエ変換を用いた水平成層弾性体の動的グリーン関数"], "weko_shared_id": 2}
直交座標系とフーリエ変換を用いた水平成層弾性体の動的グリーン関数
http://hdl.handle.net/10458/6605
http://hdl.handle.net/10458/66056a6339f5-509b-424c-b392-107a3fa8c75f
名前 / ファイル | ライセンス | アクション |
---|---|---|
fuurie_harada_2011.pdf (806.6 kB)
|
|
Item type | 学術雑誌論文 / Journal Article(1) | |||||
---|---|---|---|---|---|---|
公開日 | 2020-06-21 | |||||
タイトル | ||||||
タイトル | 直交座標系とフーリエ変換を用いた水平成層弾性体の動的グリーン関数 | |||||
タイトル | ||||||
言語 | en | |||||
タイトル | Dynamic Green's functions for layered media by using 3 dimensional cartesian coordinates and Fourier transfom | |||||
言語 | ||||||
言語 | jpn | |||||
キーワード | ||||||
主題Scheme | Other | |||||
キーワード | Dynamic Green's functions for layered half space, Stiffness matrix method, Cartesian coordinates, Cylindrical coordinates | |||||
資源タイプ | ||||||
資源タイプ | journal article | |||||
著者 |
原田, 隆典
× 原田, 隆典× 松田, 良介× 中村, 真貴× 粟田, 勇志× Matsuda, Ryosuke× Awada, Yushi |
|||||
抄録 | ||||||
内容記述タイプ | Abstract | |||||
内容記述 | This paper presents the dynamic Green's functions by the use of the stiffness matrix method for layered elastic half space in Cartesian coordinates. From these Green's functions in Cartesian coordinates, the well known Green's functions in cylindrical coordinates are derived. The presented Green's functions in Cartesian coordinates are represented by the two fold Fourier integral, and then the 2 Dimensional Fast Fourier Transform (2DFFT) can be effectively used to calculate the dinamic Green's functions. To verify numerically the validity of the presented Green's functions in Cartesian coordinates, the numerical examples of comparison with the well known dynamic Green's functions of elastic half space in cylindrical coordinates are shown. | |||||
書誌情報 |
土木学会論文集 A2 巻 67(2), p. I_915-I_924, 発行日 2011 |
|||||
著者版フラグ | ||||||
出版タイプ | VoR |