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Two Algebraic Byways from Differential Equations: Gröbner Bases and Quivers


Two Algebraic Byways from Differential Equations: Gröbner Bases and Quivers


Algorithms and Computation in Mathematics, Band 28

von: Kenji Iohara, Philippe Malbos, Masa-Hiko Saito, Nobuki Takayama

CHF 118.00

Verlag: Springer
Format: PDF
Veröffentl.: 20.02.2020
ISBN/EAN: 9783030264543
Sprache: englisch

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Beschreibungen

<p>This edited volume presents a fascinating collection of lecture notes focusing on differential equations from two viewpoints: formal calculus (through the theory of Gröbner bases) and geometry (via quiver theory). Gröbner bases serve as effective models for computation in algebras of various types. Although the theory of Gröbner bases was developed in the second half of the 20<sup>th</sup> century, many works on computational methods in algebra were published well before the introduction of the modern algebraic language. Since then, new algorithms have been developed and the theory itself has greatly expanded. In comparison, diagrammatic methods in representation theory are relatively new, with the quiver varieties only being introduced – with big impact – in the 1990s.</p>

<p>Divided into two parts, the book first discusses the theory of Gröbner bases in their commutative and noncommutative contexts, with a focus on algorithmic aspects and applications of Gröbner bases to analysison systems of partial differential equations, effective analysis on rings of differential operators, and homological algebra. It then introduces representations of quivers, quiver varieties and their applications to the moduli spaces of meromorphic connections on the complex projective line.</p>

<p>While no particular reader background is assumed, the book is intended for graduate students in mathematics, engineering and related fields, as well as researchers and scholars.</p><br><p></p>
<b>Part I First Byway: Gröbner Bases</b>.- 1 <i>From Analytical Mechanical Problems to Rewriting Theory Through M. Janet</i>.- 2 Gröbner Bases in D-modules: Application to Bernstein-Sato Polynomials.- 3 Introduction to Algorithms for D-Modules with Quiver D-Modules.- 4 Noncommutative Gröbner Bases: Applications and Generalizations.- 5 Introduction to Computational Algebraic Statistics.- <b>Part II Second Byway: Quivers</b>.- 6 Introduction to Representations of Quivers.- 7 Introduction to Quiver Varieties.- 8 On Additive Deligne-Simpson Problems.- 9 Applications of Quiver Varieties to Moduli Spaces of Connections on P1.
<b>Kenji Iohara</b> is a Professor at Université Claude Bernard &nbsp;Lyon 1, France. His research focuses mainly on the Lie theory, singularity, and special functions. He co-authored “Representation Theory of the Virasoro Algebra” (978-0-85729-159-2), published with Springer.<p><b>Philippe Malbos</b> is a Professor at Université Claude Bernard&nbsp; Lyon 1, France. His fields of research include algebraic rewriting, Gröbner bases, and homological algebra.</p>

<p><b>Masa-Hiko Saito</b> is a Professor and Director of the Center for Mathematical and Data Sciences at Kobe University, Japan. His interests include algebraic geometry and its applications to integrable systems.</p>

<p><b>Nobuki Takayama</b> is a Professor at Kobe University, Japan. His research fields comprise computer algebra, hypergeometric functions, D-modules, and algebraic statistics. He co-authored “Gröbner Deformations of Hypergeometric Differential Equations” (978-3-540-66065-1), published by Springer.</p>
<p>This edited volume presents a fascinating collection of lecture notes focusing on differential equations from two viewpoints: formal calculus (through the theory of Gröbner bases) and geometry (via quiver theory). Gröbner bases serve as effective models for computation in algebras of various types. Although the theory of Gröbner bases was developed in the second half of the 20<sup>th</sup>&nbsp;century, many works on computational methods in algebra were published well before the introduction of the modern algebraic language. Since then, new algorithms have been developed and the theory itself has greatly expanded. In comparison, diagrammatic methods in representation theory are relatively new, with the quiver varieties only being introduced – with big impact – in the 1990s.</p><p>Divided into two parts, the book first discusses the theory of Gröbner bases in their commutative and noncommutative contexts, with a focus on algorithmic aspects and applications of Gröbner bases to analysis on systems of partial differential equations, effective analysis on rings of differential operators, and homological algebra. It then introduces representations of quivers, quiver varieties and their applications to the moduli spaces of meromorphic connections on the complex projective line.</p><p>While no particular reader background is assumed, the book is intended for graduate students in mathematics, engineering and related fields, as well as researchers and scholars.</p>
Presents Gröbner bases and quiver theories as providers of computing models for differential equations and systems Offers a historical background for a better understanding of how theories developed Appeals to a wide readership, from graduate students to researchers and scholars

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