Huishi Li
Noncommutative Polynomial Algebras of Solvable Type and Their Modules
Basic Constructive-Computational Theory and Methods
Huishi Li
Noncommutative Polynomial Algebras of Solvable Type and Their Modules
Basic Constructive-Computational Theory and Methods
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This is the ¿rst book to systematically introduce the basic constructive-computational theory and methods developed for investigating solvable polynomial algebras and their modules. This book is perfectly suited to researchers and postgrads researching noncommutative computational algebra.
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This is the ¿rst book to systematically introduce the basic constructive-computational theory and methods developed for investigating solvable polynomial algebras and their modules. This book is perfectly suited to researchers and postgrads researching noncommutative computational algebra.
Produktdetails
- Produktdetails
- Verlag: CRC Press
- Seitenzahl: 218
- Erscheinungstermin: 8. November 2021
- Englisch
- Abmessung: 237mm x 159mm x 19mm
- Gewicht: 504g
- ISBN-13: 9781032079882
- ISBN-10: 1032079886
- Artikelnr.: 62267122
- Verlag: CRC Press
- Seitenzahl: 218
- Erscheinungstermin: 8. November 2021
- Englisch
- Abmessung: 237mm x 159mm x 19mm
- Gewicht: 504g
- ISBN-13: 9781032079882
- ISBN-10: 1032079886
- Artikelnr.: 62267122
Huishi Li is an emeritus Professor at the Hainan University (China). He received his PhD degree from the University of Antwerp (Belgium) under the supervision of Professor, Doctor Fred Van Oystaeyen in 1990. His research interests include noncommutative rings and algebras, ltered and graded rings, noncommutative Gröbner basis theory and applications to noncommutative algebras. He has authored or co-authored six research books (five of them are written in English and one of them is written in Chinese). Before working at the Hainan University (China), he worked at the Shaanxi Normal Universty (China), the Bilkent University (Turkey), and the Jiaying University (China) respectively. He was also a visiting scholar at the Bielefeld University (Germany), the Antwerp University (Belgium), and the University of Reims (France) respectively. After retiring from the Hainan University, he worked at the Kashgar University (China) as a volunteer teacher of mathematics for one year, and he is now a volunteer teacher of mathematics at the Xinjiang Institute of Technology (China).
1. Solvable Polynomial Algebras. 1.1. Definition, Examples, Basic
Properties. 1.2. A Constructive Characterization. 1.3. The Solvable
Polynomial Algebras H(A). 1.4. Gröbner Bases of Left Ideals. 1.5. Finite
Gröbner Bases ¿ The Noetherianess. 1.6. Elimination in Left Ideals. 2.
Gröbner Basis Theory of Free Modules. 2.1. Monomial Orderings on Free
Modules. 2.2. Gröbner Bases of Submodules. 2.3. The Noncommutative
Buchberger Algorithm. 2.4. Elimination in Submodules. 2.5. Application to
Module Homomorphisms. 3. Computation of Finite Free Resolutions and
Projective Dimension. 3.1. Computation of Syzygies. 3.2. Computation of
Finite Free Resolutions. 3.3. Global Dimension and Stability. 3.4.
Computation of p.dimAM. 4. Computation of Minimal Finite Graded Free
Resolutions. 4.1. N-graded Solvable Polynomial Algebras of (B; d( ))-type.
4.2. N-Graded Free Modules. 4.3. Computation of Minimal Homogeneous
Generating Sets. 5. Computation of Minimal Finite Filtered Free
Resolutions. 5.1. N-Filtered Solvable Polynomial Algebras of (B; d(
))-Type. 5.2. N-Filtered Free Modules. 5.3. Filtered-Graded Transfer of
Gröbner Bases for Modules. 5.4. F-Bases and Standard Bases with Respect to
Good Filtration. 5.5. Computation of Minimal F-Bases and Minimal Standard
Bases. 5.6. Minimal Filtered Free Resolutions and Their Uniqueness. 5.7.
Computation of Minimal Finite Filtered Free Resolutions. Appendix.
Properties. 1.2. A Constructive Characterization. 1.3. The Solvable
Polynomial Algebras H(A). 1.4. Gröbner Bases of Left Ideals. 1.5. Finite
Gröbner Bases ¿ The Noetherianess. 1.6. Elimination in Left Ideals. 2.
Gröbner Basis Theory of Free Modules. 2.1. Monomial Orderings on Free
Modules. 2.2. Gröbner Bases of Submodules. 2.3. The Noncommutative
Buchberger Algorithm. 2.4. Elimination in Submodules. 2.5. Application to
Module Homomorphisms. 3. Computation of Finite Free Resolutions and
Projective Dimension. 3.1. Computation of Syzygies. 3.2. Computation of
Finite Free Resolutions. 3.3. Global Dimension and Stability. 3.4.
Computation of p.dimAM. 4. Computation of Minimal Finite Graded Free
Resolutions. 4.1. N-graded Solvable Polynomial Algebras of (B; d( ))-type.
4.2. N-Graded Free Modules. 4.3. Computation of Minimal Homogeneous
Generating Sets. 5. Computation of Minimal Finite Filtered Free
Resolutions. 5.1. N-Filtered Solvable Polynomial Algebras of (B; d(
))-Type. 5.2. N-Filtered Free Modules. 5.3. Filtered-Graded Transfer of
Gröbner Bases for Modules. 5.4. F-Bases and Standard Bases with Respect to
Good Filtration. 5.5. Computation of Minimal F-Bases and Minimal Standard
Bases. 5.6. Minimal Filtered Free Resolutions and Their Uniqueness. 5.7.
Computation of Minimal Finite Filtered Free Resolutions. Appendix.
1. Solvable Polynomial Algebras. 1.1. Definition, Examples, Basic
Properties. 1.2. A Constructive Characterization. 1.3. The Solvable
Polynomial Algebras H(A). 1.4. Gröbner Bases of Left Ideals. 1.5. Finite
Gröbner Bases ¿ The Noetherianess. 1.6. Elimination in Left Ideals. 2.
Gröbner Basis Theory of Free Modules. 2.1. Monomial Orderings on Free
Modules. 2.2. Gröbner Bases of Submodules. 2.3. The Noncommutative
Buchberger Algorithm. 2.4. Elimination in Submodules. 2.5. Application to
Module Homomorphisms. 3. Computation of Finite Free Resolutions and
Projective Dimension. 3.1. Computation of Syzygies. 3.2. Computation of
Finite Free Resolutions. 3.3. Global Dimension and Stability. 3.4.
Computation of p.dimAM. 4. Computation of Minimal Finite Graded Free
Resolutions. 4.1. N-graded Solvable Polynomial Algebras of (B; d( ))-type.
4.2. N-Graded Free Modules. 4.3. Computation of Minimal Homogeneous
Generating Sets. 5. Computation of Minimal Finite Filtered Free
Resolutions. 5.1. N-Filtered Solvable Polynomial Algebras of (B; d(
))-Type. 5.2. N-Filtered Free Modules. 5.3. Filtered-Graded Transfer of
Gröbner Bases for Modules. 5.4. F-Bases and Standard Bases with Respect to
Good Filtration. 5.5. Computation of Minimal F-Bases and Minimal Standard
Bases. 5.6. Minimal Filtered Free Resolutions and Their Uniqueness. 5.7.
Computation of Minimal Finite Filtered Free Resolutions. Appendix.
Properties. 1.2. A Constructive Characterization. 1.3. The Solvable
Polynomial Algebras H(A). 1.4. Gröbner Bases of Left Ideals. 1.5. Finite
Gröbner Bases ¿ The Noetherianess. 1.6. Elimination in Left Ideals. 2.
Gröbner Basis Theory of Free Modules. 2.1. Monomial Orderings on Free
Modules. 2.2. Gröbner Bases of Submodules. 2.3. The Noncommutative
Buchberger Algorithm. 2.4. Elimination in Submodules. 2.5. Application to
Module Homomorphisms. 3. Computation of Finite Free Resolutions and
Projective Dimension. 3.1. Computation of Syzygies. 3.2. Computation of
Finite Free Resolutions. 3.3. Global Dimension and Stability. 3.4.
Computation of p.dimAM. 4. Computation of Minimal Finite Graded Free
Resolutions. 4.1. N-graded Solvable Polynomial Algebras of (B; d( ))-type.
4.2. N-Graded Free Modules. 4.3. Computation of Minimal Homogeneous
Generating Sets. 5. Computation of Minimal Finite Filtered Free
Resolutions. 5.1. N-Filtered Solvable Polynomial Algebras of (B; d(
))-Type. 5.2. N-Filtered Free Modules. 5.3. Filtered-Graded Transfer of
Gröbner Bases for Modules. 5.4. F-Bases and Standard Bases with Respect to
Good Filtration. 5.5. Computation of Minimal F-Bases and Minimal Standard
Bases. 5.6. Minimal Filtered Free Resolutions and Their Uniqueness. 5.7.
Computation of Minimal Finite Filtered Free Resolutions. Appendix.