{"_buckets": {"deposit": "2a024155-82e2-40c9-acca-327a08148d2c"}, "_deposit": {"id": "39973", "owners": [], "pid": {"revision_id": 0, "type": "depid", "value": "39973"}, "status": "published"}, "_oai": {"id": "oai:repository.dl.itc.u-tokyo.ac.jp:00039973"}, "item_4_biblio_info_7": {"attribute_name": "\u66f8\u8a8c\u60c5\u5831", "attribute_value_mlt": [{"bibliographicIssueDates": {"bibliographicIssueDate": "2015-02-27", "bibliographicIssueDateType": "Issued"}, "bibliographicIssueNumber": "1", "bibliographicPageEnd": "246", "bibliographicPageStart": "219", "bibliographicVolumeNumber": "22", "bibliographic_titles": [{"bibliographic_title": "Journal of mathematical sciences, the University of Tokyo"}]}]}, "item_4_description_5": {"attribute_name": "\u6284\u9332", "attribute_value_mlt": [{"subitem_description": "Let X be a compact K\u00e4hler threefold such that the base of the MRC-fibration has dimension two. We prove that X is bimeromorphic to a Mori fibre space. Together with our earlier result [HP13] this completes the MMP for compact K\u00e4hler threefolds: let X be a non-projective compact K\u00e4hler threefold. Then X has a minimal model or X is bimeromorphic to a Mori fibre space over a non-projective K\u00e4hler surface.", "subitem_description_type": "Abstract"}]}, "item_4_publisher_20": {"attribute_name": "\u51fa\u7248\u8005", "attribute_value_mlt": [{"subitem_publisher": "Graduate School of Mathematical Sciences, The University of Tokyo"}]}, "item_4_source_id_10": {"attribute_name": "\u66f8\u8a8c\u30ec\u30b3\u30fc\u30c9ID", "attribute_value_mlt": [{"subitem_source_identifier": "AA11021653", "subitem_source_identifier_type": "NCID"}]}, "item_4_source_id_8": {"attribute_name": "ISSN", "attribute_value_mlt": [{"subitem_source_identifier": "13405705", "subitem_source_identifier_type": "ISSN"}]}, "item_4_subject_15": {"attribute_name": "\u65e5\u672c\u5341\u9032\u5206\u985e\u6cd5", "attribute_value_mlt": [{"subitem_subject": "415", "subitem_subject_scheme": "NDC"}]}, "item_4_text_16": {"attribute_name": "Mathematical Reviews Number", "attribute_value_mlt": [{"subitem_text_value": "MR"}]}, "item_4_text_17": {"attribute_name": "Mathmatical Subject Classification", "attribute_value_mlt": [{"subitem_text_value": "32J27(MSC2010)"}, {"subitem_text_value": "14E30(MSC2010)"}, {"subitem_text_value": "14J30(MSC2010)"}, {"subitem_text_value": "32J17(MSC2010)"}, {"subitem_text_value": "32J25(MSC2010)"}]}, "item_4_text_33": {"attribute_name": "\u539f\u7a3f\u53d7\u9818\u65e5", "attribute_value_mlt": [{"subitem_text_value": "2014-07-09"}]}, "item_4_text_34": {"attribute_name": "\u8cc7\u6e90\u30bf\u30a4\u30d7", "attribute_value_mlt": [{"subitem_text_value": "Departmental Bulletin Paper"}]}, "item_4_text_4": {"attribute_name": "\u8457\u8005\u6240\u5c5e", "attribute_value_mlt": [{"subitem_text_value": "Laboratoire de Math\u00e9matiques J.A. Dieudonn\u00e9, UMR 7351 CNR"}, {"subitem_text_value": "Mathematisches Institut, Universit\u00e4t Bayreuth"}]}, "item_creator": {"attribute_name": "\u8457\u8005", "attribute_type": "creator", "attribute_value_mlt": [{"creatorNames": [{"creatorName": "H\u00f6ring, Andreas"}], "nameIdentifiers": [{"nameIdentifier": "92388", "nameIdentifierScheme": "WEKO"}]}, {"creatorNames": [{"creatorName": "Peternell, Thomas"}], "nameIdentifiers": [{"nameIdentifier": "92389", "nameIdentifierScheme": "WEKO"}]}]}, "item_files": {"attribute_name": "\u30d5\u30a1\u30a4\u30eb\u60c5\u5831", "attribute_type": "file", "attribute_value_mlt": [{"accessrole": "open_date", "date": [{"dateType": "Available", "dateValue": "2017-06-14"}], "displaytype": "detail", "download_preview_message": "", "file_order": 0, "filename": "jms220107.pdf", "filesize": [{"value": "192.7 kB"}], "format": "application/pdf", "future_date_message": "", "is_thumbnail": false, "licensetype": "license_free", "mimetype": "application/pdf", "size": 192700.0, "url": {"label": "jms220107.pdf", "url": "https://repository.dl.itc.u-tokyo.ac.jp/record/39973/files/jms220107.pdf"}, "version_id": "8c10f4f6-aca0-4df0-8b3c-4eba640a68bf"}]}, "item_keyword": {"attribute_name": "\u30ad\u30fc\u30ef\u30fc\u30c9", "attribute_value_mlt": [{"subitem_subject": "MMP", "subitem_subject_scheme": "Other"}, {"subitem_subject": "rational curves", "subitem_subject_scheme": "Other"}, {"subitem_subject": "Zariski decomposition", "subitem_subject_scheme": "Other"}, {"subitem_subject": "K\u00e4hler manifolds", "subitem_subject_scheme": "Other"}]}, "item_language": {"attribute_name": "\u8a00\u8a9e", "attribute_value_mlt": [{"subitem_language": "eng"}]}, "item_resource_type": {"attribute_name": "\u8cc7\u6e90\u30bf\u30a4\u30d7", "attribute_value_mlt": [{"resourcetype": "departmental bulletin paper", "resourceuri": "http://purl.org/coar/resource_type/c_6501"}]}, "item_title": "Mori Fibre Spaces for K\u00e4hler Threefolds", "item_titles": {"attribute_name": "\u30bf\u30a4\u30c8\u30eb", "attribute_value_mlt": [{"subitem_title": "Mori Fibre Spaces for K\u00e4hler Threefolds"}]}, "item_type_id": "4", "owner": "1", "path": ["312/6865/6873/6881", "9/504/6868/6875/6882"], "permalink_uri": "http://hdl.handle.net/2261/59268", "pubdate": {"attribute_name": "\u516c\u958b\u65e5", "attribute_value": "2016-03-03"}, "publish_date": "2016-03-03", "publish_status": "0", "recid": "39973", "relation": {}, "relation_version_is_last": true, "title": ["Mori Fibre Spaces for K\u00e4hler Threefolds"], "weko_shared_id": null}