WEKO3
アイテム
{"_buckets": {"deposit": "bb9fbc39-718e-4b38-b90b-0dab1f6bcdf8"}, "_deposit": {"created_by": 3, "id": "6853", "owners": [3], "pid": {"revision_id": 0, "type": "depid", "value": "6853"}, "status": "published"}, "_oai": {"id": "oai:ynu.repo.nii.ac.jp:00006853", "sets": ["658"]}, "author_link": ["29759", "29758"], "item_6_biblio_info_8": {"attribute_name": "書誌情報", "attribute_value_mlt": [{"bibliographicIssueDates": {"bibliographicIssueDate": "1993", "bibliographicIssueDateType": "Issued"}, "bibliographicIssueNumber": "2", "bibliographicPageEnd": "120", "bibliographicPageStart": "115", "bibliographicVolumeNumber": "40", "bibliographic_titles": [{"bibliographic_title": "Yokohama Mathematical Journal = 横濱市立大學紀要. D部門, 数学"}]}]}, "item_6_description_17": {"attribute_name": "フォーマット", "attribute_value_mlt": [{"subitem_description": "application/pdf", "subitem_description_type": "Other"}]}, "item_6_description_5": {"attribute_name": "抄録", "attribute_value_mlt": [{"subitem_description": "Let $¥mathcal{F}$ be a family of distribution functions and let $¥nu$ be a stationary ergodic probability measure on $¥mathcal{F}_{1}^{¥infty}=¥prod_{i=1}^{¥infty}¥mathcal{F}$ of copies of $¥mathcal{F}$ . Now for each $¥omega=$ $(F_{1}^{¥omega}, F_{2}^{¥omega}, ¥cdots)¥in ¥mathcal{F}_{1}^{¥infty}$ , we define a probability measure $P_{¥omega}$ on $(R_{1}^{¥infty}, B_{1}^{¥infty})$ so that $P_{¥omega}=¥prod_{¥ell=1}^{¥infty}¥mathcal{F}_{¥ell}^{¥omega}$ , Let $X_{n}$ ; $R_{1}^{¥infty}¥rightarrow R$ be the coordinate functions $X_{n}(x)=x_{n},$ $x=$ $(x_{n})$ . In this paper we study LIL for partial sums of $¥{X_{n}¥}$ with respect to $P_{¥omega}$ and as a special case of above model we also study LIL for interchangeable process.", "subitem_description_type": "Abstract"}]}, "item_6_publisher_35": {"attribute_name": "出版者", "attribute_value_mlt": [{"subitem_publisher": "Yokohama City University"}]}, "item_6_source_id_11": {"attribute_name": "書誌レコードID", "attribute_value_mlt": [{"subitem_source_identifier": "AA0089285X", "subitem_source_identifier_type": "NCID"}]}, "item_6_source_id_9": {"attribute_name": "ISSN", "attribute_value_mlt": [{"subitem_source_identifier": "00440523", "subitem_source_identifier_type": "ISSN"}]}, "item_6_text_4": {"attribute_name": "著者所属", "attribute_value_mlt": [{"subitem_text_value": "Department of Statistics, Hyosung Woman\u0027s University, Kyungbuk 713-702, South Korea"}, {"subitem_text_value": "Department of Mathematics, Kyungpook National University, South Korea"}]}, "item_6_version_type_18": {"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": "Hong, Dug Hun"}], "nameIdentifiers": [{"nameIdentifier": "29758", "nameIdentifierScheme": "WEKO"}]}, {"creatorNames": [{"creatorName": "Kwon, Joong Sung"}], "nameIdentifiers": [{"nameIdentifier": "29759", "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": "2016-09-26"}], "displaytype": "detail", "download_preview_message": "", "file_order": 0, "filename": "YMJ_40_N2_1993_115-120.pdf", "filesize": [{"value": "438.3 kB"}], "format": "application/pdf", "future_date_message": "", "is_thumbnail": false, "licensetype": "license_free", "mimetype": "application/pdf", "size": 438300.0, "url": {"label": "YMJ_40_N2_1993_115-120.pdf", "url": "https://ynu.repo.nii.ac.jp/record/6853/files/YMJ_40_N2_1993_115-120.pdf"}, "version_id": "05fe4957-b1e8-407d-949e-fce2f1d9f269"}]}, "item_language": {"attribute_name": "言語", "attribute_value_mlt": [{"subitem_language": "eng"}]}, "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": "AN LIL FOR RANDOM WALKS WITH TIME STATIONARY RANDOM DISTRIBUTION FUNCTION", "item_titles": {"attribute_name": "タイトル", "attribute_value_mlt": [{"subitem_title": "AN LIL FOR RANDOM WALKS WITH TIME STATIONARY RANDOM DISTRIBUTION FUNCTION"}]}, "item_type_id": "6", "owner": "3", "path": ["658"], "permalink_uri": "http://hdl.handle.net/10131/5603", "pubdate": {"attribute_name": "公開日", "attribute_value": "2009-12-15"}, "publish_date": "2009-12-15", "publish_status": "0", "recid": "6853", "relation": {}, "relation_version_is_last": true, "title": ["AN LIL FOR RANDOM WALKS WITH TIME STATIONARY RANDOM DISTRIBUTION FUNCTION"], "weko_shared_id": 3}
AN LIL FOR RANDOM WALKS WITH TIME STATIONARY RANDOM DISTRIBUTION FUNCTION
http://hdl.handle.net/10131/5603
http://hdl.handle.net/10131/5603be907b18-5e29-447a-8cd8-d071abdf7209
名前 / ファイル | ライセンス | アクション |
---|---|---|
YMJ_40_N2_1993_115-120.pdf (438.3 kB)
|
|
Item type | 紀要論文 / Departmental Bulletin Paper(1) | |||||
---|---|---|---|---|---|---|
公開日 | 2009-12-15 | |||||
タイトル | ||||||
タイトル | AN LIL FOR RANDOM WALKS WITH TIME STATIONARY RANDOM DISTRIBUTION FUNCTION | |||||
言語 | ||||||
言語 | eng | |||||
資源タイプ | ||||||
資源タイプ識別子 | http://purl.org/coar/resource_type/c_6501 | |||||
資源タイプ | departmental bulletin paper | |||||
著者 |
Hong, Dug Hun
× Hong, Dug Hun× Kwon, Joong Sung |
|||||
著者所属 | ||||||
Department of Statistics, Hyosung Woman's University, Kyungbuk 713-702, South Korea | ||||||
著者所属 | ||||||
Department of Mathematics, Kyungpook National University, South Korea | ||||||
抄録 | ||||||
内容記述タイプ | Abstract | |||||
内容記述 | Let $¥mathcal{F}$ be a family of distribution functions and let $¥nu$ be a stationary ergodic probability measure on $¥mathcal{F}_{1}^{¥infty}=¥prod_{i=1}^{¥infty}¥mathcal{F}$ of copies of $¥mathcal{F}$ . Now for each $¥omega=$ $(F_{1}^{¥omega}, F_{2}^{¥omega}, ¥cdots)¥in ¥mathcal{F}_{1}^{¥infty}$ , we define a probability measure $P_{¥omega}$ on $(R_{1}^{¥infty}, B_{1}^{¥infty})$ so that $P_{¥omega}=¥prod_{¥ell=1}^{¥infty}¥mathcal{F}_{¥ell}^{¥omega}$ , Let $X_{n}$ ; $R_{1}^{¥infty}¥rightarrow R$ be the coordinate functions $X_{n}(x)=x_{n},$ $x=$ $(x_{n})$ . In this paper we study LIL for partial sums of $¥{X_{n}¥}$ with respect to $P_{¥omega}$ and as a special case of above model we also study LIL for interchangeable process. | |||||
書誌情報 |
Yokohama Mathematical Journal = 横濱市立大學紀要. D部門, 数学 巻 40, 号 2, p. 115-120, 発行日 1993 |
|||||
ISSN | ||||||
収録物識別子タイプ | ISSN | |||||
収録物識別子 | 00440523 | |||||
書誌レコードID | ||||||
収録物識別子タイプ | NCID | |||||
収録物識別子 | AA0089285X | |||||
フォーマット | ||||||
内容記述タイプ | Other | |||||
内容記述 | application/pdf | |||||
著者版フラグ | ||||||
出版タイプ | VoR | |||||
出版タイプResource | http://purl.org/coar/version/c_970fb48d4fbd8a85 | |||||
出版者 | ||||||
出版者 | Yokohama City University |