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Algebraic Groups and Differential Galois Theory (Graduate Studies in Mathematics)

جلد کتاب Algebraic Groups and Differential Galois Theory (Graduate Studies in Mathematics)

معرفی کتاب «Algebraic Groups and Differential Galois Theory (Graduate Studies in Mathematics)» نوشتهٔ B.A. Paris و Teresa Crespo, Zbigniew Hajto، منتشرشده توسط نشر American Mathematical Society ; [Eurospan [distributor در سال 2011. این کتاب در فرمت pdf، زبان انگلیسی ارائه شده است.

Differential Galois theory has seen intense research activity during the last decades in several directions: elaboration of more general theories, computational aspects, model theoretic approaches, applications to classical and quantum mechanics as well as to other mathematical areas such as number theory. This book intends to introduce the reader to this subject by presenting Picard-Vessiot theory, i.e. Galois theory of linear differential equations, in a self-contained way. The needed prerequisites from algebraic geometry and algebraic groups are contained in the first two parts of the book. The third part includes Picard-Vessiot extensions, the fundamental theorem of Picard-Vessiot theory, solvability by quadratures, Fuchsian equations, monodromy group and Kovacic's algorithm. Over one hundred exercises will help to assimilate the concepts and to introduce the reader to some topics beyond the scope of this book. This book is suitable for a graduate course in differential Galois theory. The last chapter contains several suggestions for further reading encouraging the reader to enter more deeply into different topics of differential Galois theory or related fields. Readership: Graduate students and research mathematicians interested in algebraic methods in differential equations, differential Galois theory, and dynamical systems. Preface Introduction Part 1 Algebraic Geometry Chapter 1 Affine and Projective Varieties 1.1. Affine varieties 1.2. Abstract affine varieties 1.3. Projective varieties Exercises Chapter 2 Algebraic Varieties 2.1. Prevarieties 2.2. Varieties Exercises Part 2 Algebraic Groups Chapter 3 Basic Notions 3.1. The notion of algebraic group 3.2. Connected algebraic groups 3.3. Subgroups and morphisms 3.4. Linearization of afne algebraic groups 3.5. Homogeneous spaces 3.6. Characters and semi-invariants 3.7. Quotients Exercises Chapter 4 Lie Algebras and Algebraic Groups 4.1. Lie algebras 4.2. The Lie algebra of a linear algebraic group 4.3. Decomposition of algebraic groups 4.4. Solvable algebraic groups 4.5. Correspondence between algebraic groups and Lie algebras 4.6. Subgroups of SL(2, C) Exercises Part 3 Differential Galois Theory Chapter 5 Picard-Vessiot Extensions 5.1. Derivations 5.2. Differential rings 5.3. Differential extensions 5.4. The ring of differential operators 5.5. Homogeneous linear differential equations 5.6. The Picard-Vessiot extension Exercises Chapter 6 The Galois Correspondence 6.1. Differential Galois group 6.2. The differential Galois group as a linear algebraic group 6.3. The fundamental theorem of differential Galois theory 6.4. Liouville extensions 6.5. Generalized Liouville extensions Exercises Chapter 7 Differential Equations over C(z) 7.1. Fuchsian differential equations 7.2. Monodromy group 7.3. Kovacic's algorithm 7.3.1. Determination of the possible cases. 7.3.2. The algorithm for case 1. 7.3.3. The algorithm for case 2. 7.3.4. The algorithm for case 3. Exercises Chapter 8 Suggestions for Further Reading Bibliography Index Differential Galois Theory Has Seen Intense Research Activity During The Last Decades In Several Directions: Elaboration Of More General Theories, Computational Aspects, Model Theoretic Approaches, Applications To Classical And Quantum Mechanics As Well As To Other Mathematical Areas Such As Number Theory. This Book Intends To Introduce The Reader To This Subject By Presenting Picard-vessiot Theory, I.e. Galois Theory Of Linear Differential Equations, In A Self-contained Way. The Needed Prerequisites From Algebraic Geometry And Algebraic Groups Are Contained In The First Two Parts Of The Book. The Third Part Includes Picard-vessiot Extensions, The Fundamental Theorem Of Picard-vessiot Theory, Solvability By Quadratures, Fuchsian Equations, Monodromy Group And Kovacic's Algorithm. Over One Hundred Exercises Will Help To Assimilate The Concepts And To Introduce The Reader To Some Topics Beyond The Scope Of This Book.-- Pt. 1. Algebraic Geometry -- Affine And Projective Varieties -- Algebraic Varieties -- Pt. 2. Algebraic Groups -- Basic Notions -- Lie Algebras And Algebraic Groups -- Pt. 3. Differential Galois Theory -- Picard-vessiot Extensions -- The Galois Correspondence -- Differential Equations Over C(z) -- Suggestions For Further Reading. Teresa Crespo, Zbigniew Hajto. Includes Bibliographical References (p. 219-222) And Index. "Differential Galois theory has seen intense research activity during the last decades in several directions: elaboration of more general theories, computational aspects, model theoretic approaches, applications to classical and quantum mechanics as well as to other mathematical areas such as number theory. This book intends to introduce the reader to this subject by presenting Picard-Vessiot theory, i.e. Galois theory of linear differential equations, in a self-contained way. The needed prerequisites from algebraic geometry and algebraic groups are contained in the first two parts of the book. The third part includes Picard-Vessiot extensions, the fundamental theorem of Picard-Vessiot theory, solvability by quadratures, Fuchsian equations, monodromy group and Kovacic's algorithm. Over one hundred exercises will help to assimilate the concepts and to introduce the reader to some topics beyond the scope of this book."-- Provided by publisher Differential Galois theory has seen intense research activity during the last decades in several directions: elaboration of more general theories, computational aspects, model theoretic approaches, applications to classical and quantum mechanics as well as to other mathematical areas such as number theory. This book intends to introduce the reader to this subject by presenting Picard-Vessiot theory, i.e. Galois theory of linear differential equations, in a self-contained way. The needed prerequisites from algebraic geometry and algebraic groups are contained in the first two parts of the book. The third part includes Picard-Vessiot extensions, the fundamental theorem of Picard-Vessiot theory, solvability by quadratures, Fuchsian equations, monodromy group and Kovacic's algorithm. Over one hundred exercises will help to assimilate the concepts and to introduce the reader to some topics beyond the scope of this book (résumé de l'éditeur)
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