论文信息 - Combinatorial Deformations of Algebras: Twisting and Perturbations

Combinatorial Deformations of Algebras: Twisting and Perturbations

The framework used to prove the multiplicative law deformation of the algebra of Feynman-Bender diagrams is a \textit{twisted shifted dual law} (in fact, twice). We give here a clear interpretation of its two parameters. The crossing parameter is a deformation of the tensor structure whereas the superposition parameters is a perturbation of the shuffle coproduct of Hoffman type which, in turn, can be interpreted as the diagonal restriction of a superproduct. Here, we systematically detail these constructions.

[1] N. Bourbaki. Algebra I: Chapters 1-3 , 1989 .

[2] Karol A. Penson,et al. A three-parameter Hopf deformation of the algebra of Feynman-like diagrams* , 2007, 0704.2522.

[3] J. Désarménien,et al. QUELQUES REMARQUES SUR LES SUPER-ALGEBRES DE LIE LIBRES , 1994 .

[4] Daniel Krob,et al. Noncommutative symmetric functions III: Deformations of Cauchy and convolution algebras , 2006, Discret. Math. Theor. Comput. Sci..

[5] R. Tennant. Algebra , 1941, Nature.

[6] Éric Laugerotte,et al. Direct and dual laws for automata with multiplicities , 2001, Theor. Comput. Sci..

[7] Jian-Hua Zhou. Combinatoire des dérivations , 1996 .

[8] Alexander A. Mikhalev,et al. Combinatorial Aspects of Lie Superalgebras , 1995 .

[9] M. Rosso,et al. Groupes quantiques et algèbres de battage quantiques , 1995 .

[10] Bernhard K. Meister,et al. Quantum field theory of partitions , 1999 .

[11] N. Bourbaki,et al. Lie Groups and Lie Algebras: Chapters 1-3 , 1989 .

[12] E C G Sudarshan,et al. Lie Groups and Lie Algebras , 2010 .

[13] R. Ree,et al. Generalized Lie Elements , 1960, Canadian Journal of Mathematics.

[14] M. Lothaire,et al. Combinatorics on words: Frontmatter , 1997 .

[15] Gérard Duchamp,et al. Noncommutative Symmetric Functions Vi: Free Quasi-Symmetric Functions and Related Algebras , 2002, Int. J. Algebra Comput..