论文信息 - Clifford and Graßmann Hopf algebras via the BIGEBRA package for Maple

Clifford and Graßmann Hopf algebras via the BIGEBRA package for Maple

Hopf algebraic structures will replace groups and group representations as the leading paradigm in forthcoming times. K-theory, co-homology, entanglement, statistics, representation categories, quantized or twisted structures as well as more geometric topics of invariant theory, e.g., the Grasmann-Cayley bracket algebra, are all covered by the Hopf algebraic framework. The new branch of experimental mathematics allows one to easily enter these fields through direct calculations using symbolic manipulation and computer algebra system (CAS). We discuss problems which were solved when building the BIGEBRA package for Maple and CLIFFORD 1 to handle tensor products, Grasmann and Clifford algebras, coalgebras and Hopf algebras. Recent results showing the usefulness of CAS for investigating new and involved mathematics provide us with examples. An outlook on further developments is given.

Bertfried Fauser | Rafal Ablamowicz

[1] A quantum field algebra , 2002, math-ph/0201033.

[2] G. C. Rota,et al. Plethystic Hopf algebras. , 1994, Proceedings of the National Academy of Sciences of the United States of America.

[3] G. Greuel,et al. A Singular Introduction to Commutative Algebra , 2002 .

[4] Robert Oeckl,et al. Quantum field theory and Hopf algebra cohomology , 2003 .

[5] V. Lyubashenko. Modular transformations for tensor categories , 1995 .

[6] Bertfried Fauser,et al. Mathematics of Clifford - a Maple package for Clifford and Graßmann algebras , 2002 .

[8] Bertfried Fauser. A Treatise on Quantum Clifford Algebras , 2002 .

[9] Clifford Hopf gebra for two-dimensional space , 2000, math/0011263.

[10] Pierre Cartier,et al. The algebraic theory of spinors and Clifford algebras , 1996 .

[11] Z. Oziewicz. Guest Editor's Note: Clifford Algebras and Their Applications , 2001 .

[12] S. Majid. Foundations of Quantum Group Theory , 1995 .

[13] V. Lyubashenko. Tangles and Hopf algebras in braided categories , 1995 .

[14] G. M. Kelly,et al. Coherence for compact closed categories , 1980 .

[15] Bertfried Fauser. On the Hopf algebraic origin of Wick normal ordering , 2001 .

[16] Francis J. Wright. Computing with Maple , 2001 .

[17] John Milnor,et al. On the Structure of Hopf Algebras , 1965 .