3-FOLD LOG FLIPS
Identifieur interne : 002516 ( Istex/Corpus ); précédent : 002515; suivant : 0025173-FOLD LOG FLIPS
Auteurs :Source :
- Russian Academy of Sciences. Izvestiya Mathematics [ 1468-4810 ] ; 1993-02-28.
English descriptors
- KwdEn :
- Adjunction, Adjunction formula, Algebraic, Ampleness, Analytic case, Birational, Birational contraction, Blowup, Canonical, Canonical divisor, Canonical model, Canonical singularities, Cartier, Cartier divisor, Codimension, Compact subset, Connectedness, Contractible, Corollary, Crepant, Disjoint, Divisor, Divisorial, Divisorial contraction, Divisorially, Double points, Effective divisor, Exceptional curve, Exceptional curves, Exceptional divisor, Exceptional divisors, Extraction, Extremal, Extremal extraction, Extremal rays, Flip, General hyperplane section, General point, Generic, Good extraction, Hkrv, Hyperplane, Intersects, Inverse image, Irreducible, Irreducible component, Irreducible components, Irreducible curve, Irreducible curves, Kawamata, Locus, Lsepd, Lsepd divisor, Minimal resolution, Modification, Monotonicity, Mori, Morphism, Multiplicity, Natural numbers, Negativity, Nonpositive, Nonsingular, Nontrivial, Normal crossings, Normalization, Opposite case, Other hand, Picard, Principal divisor, Pullback, Quotient, Ramified, Reducible, Same arguments, Selfintersection, Shokurov, Singularity, Small contraction, Subboundary, Subset, Terminal, Terminal extraction, Terminal model, Terminal property, Terminal singularities, Unique point.
- Teeft :
- Adjunction, Adjunction formula, Algebraic, Ampleness, Analytic case, Birational, Birational contraction, Blowup, Canonical, Canonical divisor, Canonical model, Canonical singularities, Cartier, Cartier divisor, Codimension, Compact subset, Connectedness, Contractible, Corollary, Crepant, Disjoint, Divisor, Divisorial, Divisorial contraction, Divisorially, Double points, Effective divisor, Exceptional curve, Exceptional curves, Exceptional divisor, Exceptional divisors, Extraction, Extremal, Extremal extraction, Extremal rays, Flip, General hyperplane section, General point, Generic, Good extraction, Hkrv, Hyperplane, Intersects, Inverse image, Irreducible, Irreducible component, Irreducible components, Irreducible curve, Irreducible curves, Kawamata, Locus, Lsepd, Lsepd divisor, Minimal resolution, Modification, Monotonicity, Mori, Morphism, Multiplicity, Natural numbers, Negativity, Nonpositive, Nonsingular, Nontrivial, Normal crossings, Normalization, Opposite case, Other hand, Picard, Principal divisor, Pullback, Quotient, Ramified, Reducible, Same arguments, Selfintersection, Shokurov, Singularity, Small contraction, Subboundary, Subset, Terminal, Terminal extraction, Terminal model, Terminal property, Terminal singularities, Unique point.
Url:
DOI: 10.1070/IM1993v040n01ABEH001862
Links to Exploration step
ISTEX:B3C8CFCE786E7F34F308705FDA34CF42A3726492Le document en format XML
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Izvestiya Mathematics</title><idno type="ISSN">1468-4810</idno><imprint><publisher>Institute Of Physics</publisher><pubPlace>Bristol</pubPlace><date type="published" when="1993-02-28">1993-02-28</date><biblScope unit="volume">40</biblScope><biblScope unit="issue">1</biblScope><biblScope unit="page" from="95">95</biblScope><biblScope unit="page" to="202">202</biblScope><biblScope unit="range">95-202</biblScope><biblScope unit="referenceNumber">32</biblScope><biblScope unit="citationNumber">329</biblScope></imprint><idno type="ISSN">1468-4810</idno></series></biblStruct></sourceDesc><seriesStmt><idno type="ISSN">1468-4810</idno></seriesStmt></fileDesc><profileDesc><textClass><keywords scheme="KwdEn" xml:lang="en"><term>Adjunction</term><term>Adjunction formula</term><term>Algebraic</term><term>Ampleness</term><term>Analytic case</term><term>Birational</term><term>Birational contraction</term><term>Blowup</term><term>Canonical</term><term>Canonical divisor</term><term>Canonical 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Shokurov</name></json:item></author><articleId><json:string>A04</json:string></articleId><arkIstex>ark:/67375/0T8-CWD99FQ4-3</arkIstex><language><json:string>eng</json:string></language><originalGenre><json:string>N/A</json:string></originalGenre><qualityIndicators><refBibsNative>false</refBibsNative><abstractWordCount>1</abstractWordCount><abstractCharCount>0</abstractCharCount><keywordCount>0</keywordCount><score>7.012</score><pdfWordCount>65155</pdfWordCount><pdfCharCount>283789</pdfCharCount><pdfVersion>1.4</pdfVersion><pdfPageCount>108</pdfPageCount><pdfPageSize>488 x 669 pts</pdfPageSize></qualityIndicators><title>3-FOLD LOG FLIPS</title><genre><json:string>other</json:string></genre><host><title>Russian Academy of Sciences. Izvestiya Mathematics</title><language><json:string>unknown</json:string></language><issn><json:string>1468-4810</json:string></issn><volume>40</volume><issue>1</issue><pages><first>95</first><last>202</last></pages><genre><json:string>journal</json:string></genre></host><namedEntities><unitex><date><json:string>3-2-1</json:string><json:string>1993</json:string><json:string>5-1-11</json:string><json:string>4-2-1</json:string><json:string>5-1-6</json:string><json:string>6-1-14</json:string><json:string>1970s</json:string><json:string>1-3-6</json:string><json:string>1-2-3</json:string><json:string>6-1-15</json:string><json:string>1991</json:string><json:string>3-1-2</json:string></date><geogName></geogName><orgName><json:string>Institute for Advanced Studies, Princeton</json:string><json:string>I</json:string><json:string>R2</json:string><json:string>Deutsche Forschungsgemeinschaft SFB</json:string><json:string>Taniguchi Foundation</json:string><json:string>Max Planck Gesellschaft</json:string><json:string>NSF</json:string></orgName><orgName_funder><json:string>I</json:string><json:string>R2</json:string><json:string>Deutsche Forschungsgemeinschaft SFB</json:string><json:string>Taniguchi Foundation</json:string><json:string>Max Planck Gesellschaft</json:string><json:string>NSF</json:string></orgName_funder><orgName_provider></orgName_provider><persName><json:string>G. Kempf</json:string><json:string>General</json:string><json:string>Cartier</json:string><json:string>Q. Proof</json:string><json:string>V. A. Alexeev</json:string><json:string>J. Wahl</json:string><json:string>D. Morrison</json:string><json:string>S. Mori</json:string><json:string>X. Proof</json:string><json:string>E. Viehweg</json:string><json:string>F. Knudsen</json:string><json:string>N. Nakayama</json:string><json:string>T. Nelson</json:string><json:string>M. Miyanishi</json:string><json:string>Q.E.D. Proof</json:string><json:string>J. Kollar</json:string><json:string>In</json:string><json:string>J. S. Milne</json:string><json:string>Q.E.D. Lemma</json:string><json:string>Shokurov</json:string><json:string>S. Tsunoda</json:string><json:string>S. Suppose</json:string><json:string>Dante Alighieri</json:string><json:string>K. Matsuda</json:string><json:string>M. Reid</json:string><json:string>I. Morrison</json:string><json:string>X. Q.E.D. Remark</json:string><json:string>For</json:string><json:string>K. Matsuki</json:string><json:string>S. Kleiman</json:string><json:string>D. Mumford</json:string><json:string>Q. Recall</json:string><json:string>A. Beauville</json:string><json:string>I. Suppose</json:string><json:string>H. Esnault</json:string><json:string>Q. Suppose</json:string><json:string>S. Note</json:string><json:string>D. Note</json:string><json:string>P. Proof</json:string><json:string>B. Saint-Donat</json:string><json:string>S. Take</json:string><json:string>Princeton Univ</json:string><json:string>S. Ishii</json:string><json:string>Q.E.D. Conclusion</json:string><json:string>J. Algebraic</json:string><json:string>Q. Consider</json:string><json:string>V. V. Shokurov</json:string><json:string>J. Amer</json:string><json:string>Y. Kawamata</json:string><json:string>A. I. Iliev</json:string></persName><placeName><json:string>SY</json:string><json:string>Sy</json:string><json:string>Nagoya</json:string><json:string>Moscow</json:string><json:string>Baltimore</json:string><json:string>Berkeley</json:string><json:string>MD</json:string><json:string>Amsterdam</json:string><json:string>Tokyo</json:string><json:string>Chicago</json:string><json:string>Coventry</json:string><json:string>Warwick</json:string></placeName><ref_url></ref_url><ref_bibl><json:string>[4]</json:string><json:string>[ 10]</json:string><json:string>[23]</json:string><json:string>[18]</json:string><json:string>[6]</json:string><json:string>[22]</json:string><json:string>Sendai, 1985</json:string><json:string>[8]</json:string><json:string>[17]</json:string><json:string>[1]</json:string><json:string>[10]</json:string><json:string>France, Paris, 1989</json:string><json:string>[16]</json:string><json:string>[3]</json:string><json:string>Berkeley, 1986</json:string><json:string>[20]</json:string><json:string>[5]</json:string><json:string>[15]</json:string><json:string>May 1991</json:string><json:string>[7]</json:string><json:string>[14]</json:string><json:string>[9]</json:string><json:string>[2]</json:string><json:string>[13]</json:string><json:string>Bowdoin, 1985</json:string><json:string>[19]</json:string></ref_bibl><bibl></bibl></unitex></namedEntities><ark><json:string>ark:/67375/0T8-CWD99FQ4-3</json:string></ark><publicationDate>1993</publicationDate><copyrightDate>1993</copyrightDate><doi><json:string>10.1070/IM1993v040n01ABEH001862</json:string></doi><id>B3C8CFCE786E7F34F308705FDA34CF42A3726492</id><score>1</score><fulltext><json:item><extension>pdf</extension><original>true</original><mimetype>application/pdf</mimetype><uri>https://api.istex.fr/document/B3C8CFCE786E7F34F308705FDA34CF42A3726492/fulltext/pdf</uri></json:item><json:item><extension>zip</extension><original>false</original><mimetype>application/zip</mimetype><uri>https://api.istex.fr/document/B3C8CFCE786E7F34F308705FDA34CF42A3726492/fulltext/zip</uri></json:item><istex:fulltextTEI uri="https://api.istex.fr/document/B3C8CFCE786E7F34F308705FDA34CF42A3726492/fulltext/tei"><teiHeader><fileDesc><titleStmt><title level="a" type="main" xml:lang="en">3-FOLD LOG FLIPS</title><respStmt><resp>Références bibliographiques récupérées via GROBID</resp><name resp="ISTEX-API">ISTEX-API (INIST-CNRS)</name></respStmt></titleStmt><publicationStmt><authority>ISTEX</authority><publisher scheme="https://publisher-list.data.istex.fr">Institute Of Physics</publisher><pubPlace>Bristol</pubPlace><availability><licence><p>© 1993 American Mathematical Society</p></licence><p scheme="https://loaded-corpus.data.istex.fr/ark:/67375/XBH-4D4R3TJT-T">IOP</p></availability><date>1993</date></publicationStmt><notesStmt><note type="other" scheme="https://content-type.data.istex.fr/ark:/67375/XTP-7474895G-0">other</note><note type="journal" scheme="https://publication-type.data.istex.fr/ark:/67375/JMC-0GLKJH51-B">journal</note></notesStmt><sourceDesc><biblStruct type="inbook"><analytic><title level="a" type="main" xml:lang="en">3-FOLD LOG FLIPS</title><author xml:id="author-0000"><name type="person">V V Shokurov</name></author><idno type="istex">B3C8CFCE786E7F34F308705FDA34CF42A3726492</idno><idno type="ark">ark:/67375/0T8-CWD99FQ4-3</idno><idno type="DOI">10.1070/IM1993v040n01ABEH001862</idno><idno type="ecsID">IZV_40_1_A04</idno><idno type="article-id">A04</idno></analytic><monogr><title level="j">Russian Academy of Sciences. 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