An algebraic geometric approach to separation of variables
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The work An algebraic geometric approach to separation of variables represents a distinct intellectual or artistic creation found in University of Oklahoma Libraries. This resource is a combination of several types including: Work, Language Material, Books.
The Resource
An algebraic geometric approach to separation of variables
Resource Information
The work An algebraic geometric approach to separation of variables represents a distinct intellectual or artistic creation found in University of Oklahoma Libraries. This resource is a combination of several types including: Work, Language Material, Books.
 Label
 An algebraic geometric approach to separation of variables
 Statement of responsibility
 Konrad Schöbel
 Language
 eng
 Summary
 Konrad Sch©œbel aims to lay the foundations for a consequent algebraic geometric treatment of variable separation, which is one of the oldest and most powerful methods to construct exact solutions for the fundamental equations in classical and quantum physics. The present work reveals a surprising algebraic geometric structure behind the famous list of separation coordinates, bringing together a great range of mathematics and mathematical physics, from the late 19th century theory of separation of variables to modern moduli space theory, Stasheff polytopes and operads. "I am particularly impressed by his mastery of a variety of techniques and his ability to show clearly how they interact to produce his results.ĺl℗l℗l (Jim Stasheff) ℗l Contents The Foundation: The Algebraic Integrability Conditions The Proof of Concept: A Complete Solution for the 3Sphere The Generalisation: A Solution for Spheres of Arbitrary Dimension The Perspectives: Applications and Generalisations ℗l Target Groups Scientists in the fields of Mathematical Physics and Algebraic Geometry ℗l The Author Konrad Sch©œbel studied physics and mathematics at FriedrichSchiller University Jena (Germany) and Universidad de Granada (Spain) and obtained his PhD at the Universit©♭ de Provence AixMarseille I (France). He now holds a postdoc position at FriedrichSchiller University Jena and works as a research and development engineer for applications in clinical ultrasound diagnostics
 Cataloging source
 N$T
 Dewey number
 515.353
 Index
 no index present
 LC call number
 QA377
 Literary form
 non fiction
 Nature of contents

 dictionaries
 bibliography
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Context of An algebraic geometric approach to separation of variablesWork of
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