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Leibniz Algebras: Structure and Classification is designed to introduce the reader to the theory of Leibniz algebras. Leibniz algebra is generalization of Lie algebras. These algebras preserve a unique property of Lie algebras that the right multiplication operators are derivations.
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Leibniz Algebras: Structure and Classification is designed to introduce the reader to the theory of Leibniz algebras. Leibniz algebra is generalization of Lie algebras. These algebras preserve a unique property of Lie algebras that the right multiplication operators are derivations.
Produktdetails
- Produktdetails
- Verlag: CRC Press
- Seitenzahl: 324
- Erscheinungstermin: 13. Juni 2022
- Englisch
- Abmessung: 226mm x 155mm x 20mm
- Gewicht: 408g
- ISBN-13: 9781032337722
- ISBN-10: 1032337729
- Artikelnr.: 64264844
- Verlag: CRC Press
- Seitenzahl: 324
- Erscheinungstermin: 13. Juni 2022
- Englisch
- Abmessung: 226mm x 155mm x 20mm
- Gewicht: 408g
- ISBN-13: 9781032337722
- ISBN-10: 1032337729
- Artikelnr.: 64264844
Shavkat Ayupov Shavkat Ayupov is the Director of the Institute of Mathematics of Uzbekistan Academy of Sciences, Professor at the National University of Uzbekistan and, Doctor of Sciences in Physics and Mathematics and fellow of TWAS (The Academy of Sciences for the Developing World). His research interests include Functional analysis, Algebra and Topology. Sh. Ayupov is recipient of several international titles and awards and his main research deals with the study of Operator algebras, Jordan and Lie structures on von Neumann algebras, Derivations and automorphisms on operator algebras, Structure theory of Leibniz algebras and Superalgebras and other non-associative algebras. Sh. Ayupov is an organizer of CIMPA research school workshops and International Conferences on Nonassociative Algebras and Applications and on Operator Algebras and Quantum Probability. He has spoken at numerous plenary sessions and has been invited to numerous talks in various international conferences and workshops. Sh. Ayupov is also the Chief Editor of the Uzbek Mathematical Journal and has authored 4 textbooks, 5 monographs, and more than 150 research papers which have been published in several international journals. Bakhrom Omirov Bakhrom Omirov is Professor at the National University of Uzbekistan, Doctor of Sciences in Physics and Mathematics, and research fellow at the Institute of Mathematics of the Uzbekistan Academy of Sciences. His research interests include Non associative algebras, Lie (super)algebras, Leibniz (super)algebras, n-Leibniz algebras, structure theory of algebras, p-adic analysis, evolution algebras and their applications. B. Omirov has received several local and international awards. He is currently leading several international research projects and collaborations and has been invited as a speaker to many workshops and universities abroad. He is also authored more than 100 research papers in high impact international journals. Isamiddin Rakhimov Isamiddin Rakhimov is Professor at the Universiti Technology MARA (UiTM), Doctor of Sciences in Physics and Mathematics, and research fellow at the Institute for Mathematical Research (INSPEM), Universiti Putra Malaysia. His research interests focus on the theory of finite-dimensional algebras and its applications. He has been invited to give speak in few international conferences and workshops. I. Rakhimov received his Ph.D. degree in Algebra from the Sankt Petersburg University of Russia. He has organized several international mathematical events and is on the Editorial Board of a few international journals. He has also authored 1 textbook, 2 monographs and more than 70 scientific papers published in international cited journals.
1. INTRODUCTION. 1.1. ALGEBRAS. 1.2. ASSOCIATIVE ALGEBRAS. 1.3. LIE
ALGEBRAS. 1.4. LODAY ALGEBRAS. 2. STRUCTURE OF LEIBNIZ ALGEBRAS. 2.1. SOME
PROPERTIES OF LEIBNIZ ALGEBRAS. 2.2. NILPOTENT AND SOLVABLE LEIBNIZ
ALGEBRAS. 2.3. ON LEVI'S THEOREM FOR LEIBNIZ ALGEBRAS. 2.4. SEMISIMPLE
LEIBNIZ ALGEBRAS. 3. CLASSIFICATION PROBLEM IN LOW DIMENSIONS. 3.1.
ALGEBRAIC CLASSIFICATION OF LOW-DIMENSIONAL. LEIBNIZ ALGEBRAS. 3.2.
APPLICATION. 3.3. LOW-DIMENSIONAL NILPOTENT LEIBNIZ ALGEBRAS. 3.4.
4-DIMENSIONAL SOLVABLE LEIBNIZ ALGEBRAS. 3.5. RIGIDITY OF LIE AND LEIBNIZ
ALGEBRAS. 3.6. LEIBNIZ COHOMOLOGY COMPUTATIONS. 3.7. A RIGID LEIBNIZ
ALGEBRA WITH NON-TRIVIAL HL^2. 3.8. LIE-RIGIDITY VERSUS LEIBNIZ-RIGIDITY.
4. ON SOME CLASSES OF LEIBNIZ ALGEBRAS. 5. ISOMORPHISM CRITERIA FOR
FILIFORM LEIBNIZ ALGEBRAS. 5.1. ON BASE CHANGES IN COMPLEX FILIFORM LEIBNIZ
ALGEBRAS. 5.2. A CRITERION OF ISOMORPHISMS OF COMPLEX FILIFORM. NON-LIE
LEIBNIZ ALGEBRAS.
6. CLASSIFICATION OF FILIFORM LEIBNIZ ALGEBRAS IN LOW DIMENSIONS. 6.1.
ISOMORPHISM CRITERIA FOR THE FIRST CLASS. 6.2. CLASSIFICATION OF THE FIRST
CLASS IN LOW DIMENSIONS. 6.3. ISOMORPHISM CRITERIA FOR THE SECOND CLASS.
6.4. CLASSIFICATION OF THE SECOND CLASS IN LOW DIMENSIONS. 6.5.
SIMPLIFICATIONS AND NOTATIONS IN THE THIRD CLASS. 6.6. CLASSIFICATION IN
DIMENSION FIVE. 6.7 CLASSIFICATION IN DIMENSION SIX.
ALGEBRAS. 1.4. LODAY ALGEBRAS. 2. STRUCTURE OF LEIBNIZ ALGEBRAS. 2.1. SOME
PROPERTIES OF LEIBNIZ ALGEBRAS. 2.2. NILPOTENT AND SOLVABLE LEIBNIZ
ALGEBRAS. 2.3. ON LEVI'S THEOREM FOR LEIBNIZ ALGEBRAS. 2.4. SEMISIMPLE
LEIBNIZ ALGEBRAS. 3. CLASSIFICATION PROBLEM IN LOW DIMENSIONS. 3.1.
ALGEBRAIC CLASSIFICATION OF LOW-DIMENSIONAL. LEIBNIZ ALGEBRAS. 3.2.
APPLICATION. 3.3. LOW-DIMENSIONAL NILPOTENT LEIBNIZ ALGEBRAS. 3.4.
4-DIMENSIONAL SOLVABLE LEIBNIZ ALGEBRAS. 3.5. RIGIDITY OF LIE AND LEIBNIZ
ALGEBRAS. 3.6. LEIBNIZ COHOMOLOGY COMPUTATIONS. 3.7. A RIGID LEIBNIZ
ALGEBRA WITH NON-TRIVIAL HL^2. 3.8. LIE-RIGIDITY VERSUS LEIBNIZ-RIGIDITY.
4. ON SOME CLASSES OF LEIBNIZ ALGEBRAS. 5. ISOMORPHISM CRITERIA FOR
FILIFORM LEIBNIZ ALGEBRAS. 5.1. ON BASE CHANGES IN COMPLEX FILIFORM LEIBNIZ
ALGEBRAS. 5.2. A CRITERION OF ISOMORPHISMS OF COMPLEX FILIFORM. NON-LIE
LEIBNIZ ALGEBRAS.
6. CLASSIFICATION OF FILIFORM LEIBNIZ ALGEBRAS IN LOW DIMENSIONS. 6.1.
ISOMORPHISM CRITERIA FOR THE FIRST CLASS. 6.2. CLASSIFICATION OF THE FIRST
CLASS IN LOW DIMENSIONS. 6.3. ISOMORPHISM CRITERIA FOR THE SECOND CLASS.
6.4. CLASSIFICATION OF THE SECOND CLASS IN LOW DIMENSIONS. 6.5.
SIMPLIFICATIONS AND NOTATIONS IN THE THIRD CLASS. 6.6. CLASSIFICATION IN
DIMENSION FIVE. 6.7 CLASSIFICATION IN DIMENSION SIX.
1. INTRODUCTION. 1.1. ALGEBRAS. 1.2. ASSOCIATIVE ALGEBRAS. 1.3. LIE
ALGEBRAS. 1.4. LODAY ALGEBRAS. 2. STRUCTURE OF LEIBNIZ ALGEBRAS. 2.1. SOME
PROPERTIES OF LEIBNIZ ALGEBRAS. 2.2. NILPOTENT AND SOLVABLE LEIBNIZ
ALGEBRAS. 2.3. ON LEVI'S THEOREM FOR LEIBNIZ ALGEBRAS. 2.4. SEMISIMPLE
LEIBNIZ ALGEBRAS. 3. CLASSIFICATION PROBLEM IN LOW DIMENSIONS. 3.1.
ALGEBRAIC CLASSIFICATION OF LOW-DIMENSIONAL. LEIBNIZ ALGEBRAS. 3.2.
APPLICATION. 3.3. LOW-DIMENSIONAL NILPOTENT LEIBNIZ ALGEBRAS. 3.4.
4-DIMENSIONAL SOLVABLE LEIBNIZ ALGEBRAS. 3.5. RIGIDITY OF LIE AND LEIBNIZ
ALGEBRAS. 3.6. LEIBNIZ COHOMOLOGY COMPUTATIONS. 3.7. A RIGID LEIBNIZ
ALGEBRA WITH NON-TRIVIAL HL^2. 3.8. LIE-RIGIDITY VERSUS LEIBNIZ-RIGIDITY.
4. ON SOME CLASSES OF LEIBNIZ ALGEBRAS. 5. ISOMORPHISM CRITERIA FOR
FILIFORM LEIBNIZ ALGEBRAS. 5.1. ON BASE CHANGES IN COMPLEX FILIFORM LEIBNIZ
ALGEBRAS. 5.2. A CRITERION OF ISOMORPHISMS OF COMPLEX FILIFORM. NON-LIE
LEIBNIZ ALGEBRAS.
6. CLASSIFICATION OF FILIFORM LEIBNIZ ALGEBRAS IN LOW DIMENSIONS. 6.1.
ISOMORPHISM CRITERIA FOR THE FIRST CLASS. 6.2. CLASSIFICATION OF THE FIRST
CLASS IN LOW DIMENSIONS. 6.3. ISOMORPHISM CRITERIA FOR THE SECOND CLASS.
6.4. CLASSIFICATION OF THE SECOND CLASS IN LOW DIMENSIONS. 6.5.
SIMPLIFICATIONS AND NOTATIONS IN THE THIRD CLASS. 6.6. CLASSIFICATION IN
DIMENSION FIVE. 6.7 CLASSIFICATION IN DIMENSION SIX.
ALGEBRAS. 1.4. LODAY ALGEBRAS. 2. STRUCTURE OF LEIBNIZ ALGEBRAS. 2.1. SOME
PROPERTIES OF LEIBNIZ ALGEBRAS. 2.2. NILPOTENT AND SOLVABLE LEIBNIZ
ALGEBRAS. 2.3. ON LEVI'S THEOREM FOR LEIBNIZ ALGEBRAS. 2.4. SEMISIMPLE
LEIBNIZ ALGEBRAS. 3. CLASSIFICATION PROBLEM IN LOW DIMENSIONS. 3.1.
ALGEBRAIC CLASSIFICATION OF LOW-DIMENSIONAL. LEIBNIZ ALGEBRAS. 3.2.
APPLICATION. 3.3. LOW-DIMENSIONAL NILPOTENT LEIBNIZ ALGEBRAS. 3.4.
4-DIMENSIONAL SOLVABLE LEIBNIZ ALGEBRAS. 3.5. RIGIDITY OF LIE AND LEIBNIZ
ALGEBRAS. 3.6. LEIBNIZ COHOMOLOGY COMPUTATIONS. 3.7. A RIGID LEIBNIZ
ALGEBRA WITH NON-TRIVIAL HL^2. 3.8. LIE-RIGIDITY VERSUS LEIBNIZ-RIGIDITY.
4. ON SOME CLASSES OF LEIBNIZ ALGEBRAS. 5. ISOMORPHISM CRITERIA FOR
FILIFORM LEIBNIZ ALGEBRAS. 5.1. ON BASE CHANGES IN COMPLEX FILIFORM LEIBNIZ
ALGEBRAS. 5.2. A CRITERION OF ISOMORPHISMS OF COMPLEX FILIFORM. NON-LIE
LEIBNIZ ALGEBRAS.
6. CLASSIFICATION OF FILIFORM LEIBNIZ ALGEBRAS IN LOW DIMENSIONS. 6.1.
ISOMORPHISM CRITERIA FOR THE FIRST CLASS. 6.2. CLASSIFICATION OF THE FIRST
CLASS IN LOW DIMENSIONS. 6.3. ISOMORPHISM CRITERIA FOR THE SECOND CLASS.
6.4. CLASSIFICATION OF THE SECOND CLASS IN LOW DIMENSIONS. 6.5.
SIMPLIFICATIONS AND NOTATIONS IN THE THIRD CLASS. 6.6. CLASSIFICATION IN
DIMENSION FIVE. 6.7 CLASSIFICATION IN DIMENSION SIX.