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The Resource Igusa's pAdic Local Zeta Function and the Monodromy Conjecture for NonDegenerate Surface Singularities, Bart Bories, Willem Veys
Igusa's pAdic Local Zeta Function and the Monodromy Conjecture for NonDegenerate Surface Singularities, Bart Bories, Willem Veys
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The item Igusa's pAdic Local Zeta Function and the Monodromy Conjecture for NonDegenerate Surface Singularities, Bart Bories, Willem Veys represents a specific, individual, material embodiment of a distinct intellectual or artistic creation found in University of Manitoba Libraries.This item is available to borrow from all library branches.
Resource Information
The item Igusa's pAdic Local Zeta Function and the Monodromy Conjecture for NonDegenerate Surface Singularities, Bart Bories, Willem Veys represents a specific, individual, material embodiment of a distinct intellectual or artistic creation found in University of Manitoba Libraries.
This item is available to borrow from all library branches.
 Language
 eng
 Extent
 vii, 131 pages
 Note
 "Volume 242, number 1145 (second of 4 numbers), July 2016."
 Contents

 Chapter 0. Introduction ** Chapter 1. On the Integral Points in a ThreeDimensional Fundamental Parallelepiped Spanned by Primitive Vectors ** Chapter 2. Case I: Exactly One Facet Contributes to s0 and this Facet Is a B1Simplex ** Chapter 3. Case II: Exactly One Facet Contributes to s0 and this Facet Is a NonCompact B1Facet ** Chapter 4. Case III: Exactly Two Facets of [Gamma]f Contribute to s0, and These Two Facets Are Both B1Simplices with Respect to a Same Variable and Have an Edge in Common ** Chapter 5. Case IV: Exactly Two Facets of [Gamma]f Contribute to s0, and These Two Facets Are Both NonCompact B1Facets with Respect to a Same Variable and Have an Edge in Common ** Chapter 6. Case V: Exactly Two Facets of [Gamma]f Contribute to s0; One of Them Is a NonCompact B1Facet, the Other One a B1Simplex; These Facets Are B1 with Respect to a Same Variable and Have an Edge in Common ** Chapter 7. Case VI: At Least Three Facets of [Gamma]f Contribute to s0; All of Them Are B1Facets (Compact or Not) with Respect to a Same Variable and They Are 'Connected to Each Other by Edges' ** Chapter 8. General Case: Several Groups of B1Facets Contribute to s0; Every Group Is Separately Covered By One of the Previous Cases, and the Groups Have Pairwise at Most One Point in Common ** Chapter 9. The Main Theorem for a NonTrivial Character of Zxp times ** Chapter 11. The Main Theorem in the Motivic Setting ** References
 Isbn
 9781470418410
 Label
 Igusa's pAdic Local Zeta Function and the Monodromy Conjecture for NonDegenerate Surface Singularities
 Title
 Igusa's pAdic Local Zeta Function and the Monodromy Conjecture for NonDegenerate Surface Singularities
 Statement of responsibility
 Bart Bories, Willem Veys
 Language
 eng
 Cataloging source
 DLC
 http://library.link/vocab/creatorDate
 1980
 http://library.link/vocab/creatorName
 Bories, Bart
 Dewey number
 515/.94
 Illustrations
 illustrations
 Index
 no index present
 Language note
 Text in English
 LC call number
 QA614.58
 LC item number
 .B67 2016
 Literary form
 non fiction
 Nature of contents
 bibliography
 http://library.link/vocab/relatedWorkOrContributorDate
 1963
 http://library.link/vocab/relatedWorkOrContributorName
 Veys, Wim
 Series statement
 Memoirs of the American Mathematical Society,
 Series volume
 volume 242, number 1145
 http://library.link/vocab/subjectName

 Singularities (Mathematics)
 padic fields
 padic groups
 Functions, Zeta
 Monodromy groups
 Geometry, Algebraic
 Functions, Zeta
 Geometry, Algebraic
 Monodromy groups
 padic fields
 padic groups
 Singularities (Mathematics)
 Label
 Igusa's pAdic Local Zeta Function and the Monodromy Conjecture for NonDegenerate Surface Singularities, Bart Bories, Willem Veys
 Note
 "Volume 242, number 1145 (second of 4 numbers), July 2016."
 Bibliography note
 Includes bibliographical references
 Carrier category
 volume
 Carrier category code

 nc
 Carrier MARC source
 rdacarrier
 Content category
 text
 Content type code

 txt
 Content type MARC source
 rdacontent
 Contents
 Chapter 0. Introduction ** Chapter 1. On the Integral Points in a ThreeDimensional Fundamental Parallelepiped Spanned by Primitive Vectors ** Chapter 2. Case I: Exactly One Facet Contributes to s0 and this Facet Is a B1Simplex ** Chapter 3. Case II: Exactly One Facet Contributes to s0 and this Facet Is a NonCompact B1Facet ** Chapter 4. Case III: Exactly Two Facets of [Gamma]f Contribute to s0, and These Two Facets Are Both B1Simplices with Respect to a Same Variable and Have an Edge in Common ** Chapter 5. Case IV: Exactly Two Facets of [Gamma]f Contribute to s0, and These Two Facets Are Both NonCompact B1Facets with Respect to a Same Variable and Have an Edge in Common ** Chapter 6. Case V: Exactly Two Facets of [Gamma]f Contribute to s0; One of Them Is a NonCompact B1Facet, the Other One a B1Simplex; These Facets Are B1 with Respect to a Same Variable and Have an Edge in Common ** Chapter 7. Case VI: At Least Three Facets of [Gamma]f Contribute to s0; All of Them Are B1Facets (Compact or Not) with Respect to a Same Variable and They Are 'Connected to Each Other by Edges' ** Chapter 8. General Case: Several Groups of B1Facets Contribute to s0; Every Group Is Separately Covered By One of the Previous Cases, and the Groups Have Pairwise at Most One Point in Common ** Chapter 9. The Main Theorem for a NonTrivial Character of Zxp times ** Chapter 11. The Main Theorem in the Motivic Setting ** References
 Dimensions
 25 cm.
 Extent
 vii, 131 pages
 Isbn
 9781470418410
 Lccn
 2016011017
 Media category
 unmediated
 Media MARC source
 rdamedia
 Media type code

 n
 Other physical details
 illustrations
 System control number
 (OCoLC)944408671
 Label
 Igusa's pAdic Local Zeta Function and the Monodromy Conjecture for NonDegenerate Surface Singularities, Bart Bories, Willem Veys
 Note
 "Volume 242, number 1145 (second of 4 numbers), July 2016."
 Bibliography note
 Includes bibliographical references
 Carrier category
 volume
 Carrier category code

 nc
 Carrier MARC source
 rdacarrier
 Content category
 text
 Content type code

 txt
 Content type MARC source
 rdacontent
 Contents
 Chapter 0. Introduction ** Chapter 1. On the Integral Points in a ThreeDimensional Fundamental Parallelepiped Spanned by Primitive Vectors ** Chapter 2. Case I: Exactly One Facet Contributes to s0 and this Facet Is a B1Simplex ** Chapter 3. Case II: Exactly One Facet Contributes to s0 and this Facet Is a NonCompact B1Facet ** Chapter 4. Case III: Exactly Two Facets of [Gamma]f Contribute to s0, and These Two Facets Are Both B1Simplices with Respect to a Same Variable and Have an Edge in Common ** Chapter 5. Case IV: Exactly Two Facets of [Gamma]f Contribute to s0, and These Two Facets Are Both NonCompact B1Facets with Respect to a Same Variable and Have an Edge in Common ** Chapter 6. Case V: Exactly Two Facets of [Gamma]f Contribute to s0; One of Them Is a NonCompact B1Facet, the Other One a B1Simplex; These Facets Are B1 with Respect to a Same Variable and Have an Edge in Common ** Chapter 7. Case VI: At Least Three Facets of [Gamma]f Contribute to s0; All of Them Are B1Facets (Compact or Not) with Respect to a Same Variable and They Are 'Connected to Each Other by Edges' ** Chapter 8. General Case: Several Groups of B1Facets Contribute to s0; Every Group Is Separately Covered By One of the Previous Cases, and the Groups Have Pairwise at Most One Point in Common ** Chapter 9. The Main Theorem for a NonTrivial Character of Zxp times ** Chapter 11. The Main Theorem in the Motivic Setting ** References
 Dimensions
 25 cm.
 Extent
 vii, 131 pages
 Isbn
 9781470418410
 Lccn
 2016011017
 Media category
 unmediated
 Media MARC source
 rdamedia
 Media type code

 n
 Other physical details
 illustrations
 System control number
 (OCoLC)944408671
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<div class="citation" vocab="http://schema.org/"><i class="fa faexternallinksquare fafw"></i> Data from <span resource="http://link.lib.umanitoba.ca/portal/IgusaspAdicLocalZetaFunctionandthe/RQF37KfKN9s/" typeof="Book http://bibfra.me/vocab/lite/Item"><span property="name http://bibfra.me/vocab/lite/label"><a href="http://link.lib.umanitoba.ca/portal/IgusaspAdicLocalZetaFunctionandthe/RQF37KfKN9s/">Igusa's pAdic Local Zeta Function and the Monodromy Conjecture for NonDegenerate Surface Singularities, Bart Bories, Willem Veys</a></span>  <span property="potentialAction" typeOf="OrganizeAction"><span property="agent" typeof="LibrarySystem http://library.link/vocab/LibrarySystem" resource="http://link.lib.umanitoba.ca/"><span property="name http://bibfra.me/vocab/lite/label"><a property="url" href="http://link.lib.umanitoba.ca/">University of Manitoba Libraries</a></span></span></span></span></div>