Borrow it
 Architecture Library
 Bizzell Memorial Library
 Boorstin Collection
 Chinese Literature Translation Archive
 Engineering Library
 Fine Arts Library
 Harry W. Bass Business History Collection
 History of Science Collections
 John and Mary Nichols Rare Books and Special Collections
 Library Service Center
 Price College Digital Library
 Western History Collections
The Resource Algebraic theory of differential equations, edited by Malcolm A.H. MacCallum, Alexander V. Mikhailov
Algebraic theory of differential equations, edited by Malcolm A.H. MacCallum, Alexander V. Mikhailov
Resource Information
The item Algebraic theory of differential equations, edited by Malcolm A.H. MacCallum, Alexander V. Mikhailov represents a specific, individual, material embodiment of a distinct intellectual or artistic creation found in University of Oklahoma Libraries.This item is available to borrow from all library branches.
Resource Information
The item Algebraic theory of differential equations, edited by Malcolm A.H. MacCallum, Alexander V. Mikhailov represents a specific, individual, material embodiment of a distinct intellectual or artistic creation found in University of Oklahoma Libraries.
This item is available to borrow from all library branches.
 Summary
 Integration of differential equations is a central problem in mathematics and several approaches have been developed by studying analytic, algebraic, and algorithmic aspects of the subject. One of these is Differential Galois Theory, developed by Kolchin and his school, and another originates from the Soliton Theory and Inverse Spectral Transform method, which was born in the works of Kruskal, Zabusky, Gardner, Green and Miura. Many other approaches have also been developed, but there has so far been no intersection between them. This unique introduction to the subject finally brings them together, with the aim of initiating interaction and collaboration between these various mathematical communities. The collection includes a LMS Invited Lecture Course by Michael F. Singer, together with some shorter lecture courses and review articles, all based upon a miniprogramme held at the International Centre for Mathematical Sciences (ICMS) in Edinburgh
 Language
 eng
 Extent
 1 online resource (viii, 240 pages)
 Note
 Title from publisher's bibliographic system (viewed on 05 Oct 2015)
 Contents

 Galois theory of linear differential equations / Michael F. Singer
 Solving in closed form / Felix Ulmer and JacquesArthur Weil
 Factorization of linear systems / Sergey P. Tsarev
 Introduction to Dmodules / Anton Leykin
 Symbolic representation and classification of integrable systems / A.V. Mikhailov, V.S. Novikov and Jing Ping Wang
 Searching for integrable (P)DEs / Jarmo Hietarinta
 Around differential Galois theory / Anand Pillay
 Isbn
 9780511721564
 Label
 Algebraic theory of differential equations
 Title
 Algebraic theory of differential equations
 Statement of responsibility
 edited by Malcolm A.H. MacCallum, Alexander V. Mikhailov
 Language
 eng
 Summary
 Integration of differential equations is a central problem in mathematics and several approaches have been developed by studying analytic, algebraic, and algorithmic aspects of the subject. One of these is Differential Galois Theory, developed by Kolchin and his school, and another originates from the Soliton Theory and Inverse Spectral Transform method, which was born in the works of Kruskal, Zabusky, Gardner, Green and Miura. Many other approaches have also been developed, but there has so far been no intersection between them. This unique introduction to the subject finally brings them together, with the aim of initiating interaction and collaboration between these various mathematical communities. The collection includes a LMS Invited Lecture Course by Michael F. Singer, together with some shorter lecture courses and review articles, all based upon a miniprogramme held at the International Centre for Mathematical Sciences (ICMS) in Edinburgh
 Cataloging source
 UkCbUP
 Dewey number
 515.35
 Index
 index present
 LC call number
 QA370
 LC item number
 .A44 2009
 Literary form
 non fiction
 Nature of contents
 dictionaries
 http://library.link/vocab/relatedWorkOrContributorDate
 1953
 http://library.link/vocab/relatedWorkOrContributorName

 MacCallum, M. A. H.
 Mikhailov, Alexander V.
 London Mathematical Society
 Series statement
 London Mathematical Society lecture note series
 Series volume
 357
 http://library.link/vocab/subjectName

 Differential equations
 Algebraic number theory
 Differential calculus
 Differential algebra
 Label
 Algebraic theory of differential equations, edited by Malcolm A.H. MacCallum, Alexander V. Mikhailov
 Note
 Title from publisher's bibliographic system (viewed on 05 Oct 2015)
 Carrier category
 online resource
 Carrier category code

 cr
 Carrier MARC source
 rdacarrier
 Content category
 text
 Content type code

 txt
 Content type MARC source
 rdacontent
 Contents
 Galois theory of linear differential equations / Michael F. Singer  Solving in closed form / Felix Ulmer and JacquesArthur Weil  Factorization of linear systems / Sergey P. Tsarev  Introduction to Dmodules / Anton Leykin  Symbolic representation and classification of integrable systems / A.V. Mikhailov, V.S. Novikov and Jing Ping Wang  Searching for integrable (P)DEs / Jarmo Hietarinta  Around differential Galois theory / Anand Pillay
 Extent
 1 online resource (viii, 240 pages)
 Form of item
 online
 Isbn
 9780511721564
 Isbn Type
 (ebook)
 Media category
 computer
 Media MARC source
 rdamedia
 Media type code

 c
 Other physical details
 digital, PDF file(s).
 Specific material designation
 remote
 System control number
 (UkCbUP)CR9780511721564
 Label
 Algebraic theory of differential equations, edited by Malcolm A.H. MacCallum, Alexander V. Mikhailov
 Note
 Title from publisher's bibliographic system (viewed on 05 Oct 2015)
 Carrier category
 online resource
 Carrier category code

 cr
 Carrier MARC source
 rdacarrier
 Content category
 text
 Content type code

 txt
 Content type MARC source
 rdacontent
 Contents
 Galois theory of linear differential equations / Michael F. Singer  Solving in closed form / Felix Ulmer and JacquesArthur Weil  Factorization of linear systems / Sergey P. Tsarev  Introduction to Dmodules / Anton Leykin  Symbolic representation and classification of integrable systems / A.V. Mikhailov, V.S. Novikov and Jing Ping Wang  Searching for integrable (P)DEs / Jarmo Hietarinta  Around differential Galois theory / Anand Pillay
 Extent
 1 online resource (viii, 240 pages)
 Form of item
 online
 Isbn
 9780511721564
 Isbn Type
 (ebook)
 Media category
 computer
 Media MARC source
 rdamedia
 Media type code

 c
 Other physical details
 digital, PDF file(s).
 Specific material designation
 remote
 System control number
 (UkCbUP)CR9780511721564
Library Locations

Architecture LibraryBorrow itGould Hall 830 Van Vleet Oval Rm. 105, Norman, OK, 73019, US35.205706 97.445050



Chinese Literature Translation ArchiveBorrow it401 W. Brooks St., RM 414, Norman, OK, 73019, US35.207487 97.447906

Engineering LibraryBorrow itFelgar Hall 865 Asp Avenue, Rm. 222, Norman, OK, 73019, US35.205706 97.445050

Fine Arts LibraryBorrow itCatlett Music Center 500 West Boyd Street, Rm. 20, Norman, OK, 73019, US35.210371 97.448244

Harry W. Bass Business History CollectionBorrow it401 W. Brooks St., Rm. 521NW, Norman, OK, 73019, US35.207487 97.447906

History of Science CollectionsBorrow it401 W. Brooks St., Rm. 521NW, Norman, OK, 73019, US35.207487 97.447906

John and Mary Nichols Rare Books and Special CollectionsBorrow it401 W. Brooks St., Rm. 509NW, Norman, OK, 73019, US35.207487 97.447906


Price College Digital LibraryBorrow itAdams Hall 102 307 West Brooks St., Norman, OK, 73019, US35.210371 97.448244

Western History CollectionsBorrow itMonnet Hall 630 Parrington Oval, Rm. 300, Norman, OK, 73019, US35.209584 97.445414
Embed
Settings
Select options that apply then copy and paste the RDF/HTML data fragment to include in your application
Embed this data in a secure (HTTPS) page:
Layout options:
Include data citation:
<div class="citation" vocab="http://schema.org/"><i class="fa faexternallinksquare fafw"></i> Data from <span resource="http://link.libraries.ou.edu/portal/Algebraictheoryofdifferentialequations/w7QZlLd6NtU/" typeof="Book http://bibfra.me/vocab/lite/Item"><span property="name http://bibfra.me/vocab/lite/label"><a href="http://link.libraries.ou.edu/portal/Algebraictheoryofdifferentialequations/w7QZlLd6NtU/">Algebraic theory of differential equations, edited by Malcolm A.H. MacCallum, Alexander V. Mikhailov</a></span>  <span property="potentialAction" typeOf="OrganizeAction"><span property="agent" typeof="LibrarySystem http://library.link/vocab/LibrarySystem" resource="http://link.libraries.ou.edu/"><span property="name http://bibfra.me/vocab/lite/label"><a property="url" href="http://link.libraries.ou.edu/">University of Oklahoma Libraries</a></span></span></span></span></div>
Note: Adjust the width and height settings defined in the RDF/HTML code fragment to best match your requirements
Preview
Cite Data  Experimental
Data Citation of the Item Algebraic theory of differential equations, edited by Malcolm A.H. MacCallum, Alexander V. Mikhailov
Copy and paste the following RDF/HTML data fragment to cite this resource
<div class="citation" vocab="http://schema.org/"><i class="fa faexternallinksquare fafw"></i> Data from <span resource="http://link.libraries.ou.edu/portal/Algebraictheoryofdifferentialequations/w7QZlLd6NtU/" typeof="Book http://bibfra.me/vocab/lite/Item"><span property="name http://bibfra.me/vocab/lite/label"><a href="http://link.libraries.ou.edu/portal/Algebraictheoryofdifferentialequations/w7QZlLd6NtU/">Algebraic theory of differential equations, edited by Malcolm A.H. MacCallum, Alexander V. Mikhailov</a></span>  <span property="potentialAction" typeOf="OrganizeAction"><span property="agent" typeof="LibrarySystem http://library.link/vocab/LibrarySystem" resource="http://link.libraries.ou.edu/"><span property="name http://bibfra.me/vocab/lite/label"><a property="url" href="http://link.libraries.ou.edu/">University of Oklahoma Libraries</a></span></span></span></span></div>