{"created":"2023-05-15T11:19:47.280447+00:00","id":229,"links":{},"metadata":{"_buckets":{"deposit":"3ebb3562-0f74-4134-9527-4d96bf201855"},"_deposit":{"created_by":2,"id":"229","owners":[2],"pid":{"revision_id":0,"type":"depid","value":"229"},"status":"published"},"_oai":{"id":"oai:nsu.repo.nii.ac.jp:00000229","sets":["6:7:77"]},"author_link":["383","384"],"control_number":"229","item_2_biblio_info_4":{"attribute_name":"書誌情報","attribute_value_mlt":[{"bibliographicIssueDates":{"bibliographicIssueDate":"2013-06","bibliographicIssueDateType":"Issued"},"bibliographicIssueNumber":"42","bibliographicPageEnd":"77","bibliographicPageStart":"69","bibliographic_titles":[{"bibliographic_title":"新潟産業大学経済学部紀要"}]}]},"item_2_description_10":{"attribute_name":"資源タイプ","attribute_value_mlt":[{"subitem_description":"論文(Article)","subitem_description_type":"Other"}]},"item_2_description_3":{"attribute_name":"抄録","attribute_value_mlt":[{"subitem_description":"実数aのp乗根を表す方程式 を式変形し，これに土倉・堀口法を適用する．これよりp乗根の冪乗の連分数表示を得る(§2 定理6)．さらにこの連分数表示から平方根，立方根の冪乗の連分数表示を与える(§2 定理7，定理９)．われわれは§1の土倉・堀口法(村瀬義益・ニュートン型の第一拡張漸化式)と連分数の定義から出発する．","subitem_description_type":"Abstract"}]},"item_2_description_7":{"attribute_name":"フォーマット","attribute_value_mlt":[{"subitem_description":"application/pdf","subitem_description_type":"Other"}]},"item_2_full_name_2":{"attribute_name":"著者別名","attribute_value_mlt":[{"nameIdentifiers":[{"nameIdentifier":"384","nameIdentifierScheme":"WEKO"}],"names":[{"name":"HORIGUCHI, Shunji"}]}]},"item_2_publisher_9":{"attribute_name":"出版者","attribute_value_mlt":[{"subitem_publisher":"新潟産業大学附属東アジア経済文化研究所"}]},"item_2_source_id_6":{"attribute_name":"書誌レコードID","attribute_value_mlt":[{"subitem_source_identifier":"AN10492758","subitem_source_identifier_type":"NCID"}]},"item_creator":{"attribute_name":"著者","attribute_type":"creator","attribute_value_mlt":[{"creatorNames":[{"creatorName":"堀口, 俊二","creatorNameLang":"ja"}],"nameIdentifiers":[{"nameIdentifier":"383","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":"2019-10-24"}],"displaytype":"detail","filename":"42_69-77.pdf","filesize":[{"value":"2.3 MB"}],"format":"application/pdf","licensetype":"license_note","mimetype":"application/pdf","url":{"label":"42_69-77.pdf","url":"https://nsu.repo.nii.ac.jp/record/229/files/42_69-77.pdf"},"version_id":"4d965d13-af36-4f80-abeb-7fe333d08adb"}]},"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":"departmental bulletin paper","resourceuri":"http://purl.org/coar/resource_type/c_6501"}]},"item_title":"土倉・堀口法(村瀬義益・ニュートン型の第一拡張漸化式)から得られる平方根,立方根の冪乗の連分数表示","item_titles":{"attribute_name":"タイトル","attribute_value_mlt":[{"subitem_title":"土倉・堀口法(村瀬義益・ニュートン型の第一拡張漸化式)から得られる平方根,立方根の冪乗の連分数表示","subitem_title_language":"ja"},{"subitem_title":"Continued Fraction Presentations of the Powers of Square Root and Cubic Root by the Tsuchikura-Horiguchi’s Method(the First Extension Recurrence Formula of Murase Yoshimasu-Newton’s type)","subitem_title_language":"en"}]},"item_type_id":"2","owner":"2","path":["77"],"pubdate":{"attribute_name":"公開日","attribute_value":"2013-08-08"},"publish_date":"2013-08-08","publish_status":"0","recid":"229","relation_version_is_last":true,"title":["土倉・堀口法(村瀬義益・ニュートン型の第一拡張漸化式)から得られる平方根,立方根の冪乗の連分数表示"],"weko_creator_id":"2","weko_shared_id":-1},"updated":"2023-07-20T05:09:52.244384+00:00"}