Mathematics – Quantum Algebra
Scientific paper
1995-05-16
Mathematics
Quantum Algebra
Latex, 15 pages
Scientific paper
Let $V$ be a finite dimensional vector space. Given a decomposition $V\otimes V=\oplus_i^n I_i$, define $n$ quadratic algebras $(V, J_m)$ where $J_m=\oplus_{i\neq m} I_i$. This decomposition defines also the quantum semigroup $M(V;I_1,...,I_n)$ which acts on all these quadratic algebras. With the decomposition we associate a family of associative algebras $A_k=A_k(I_1,...I_n)$, $k\geq 2$. In the classical case, when $V\otimes V$ decomposes into the symmetric and skewsymmetric tensors, $A_k$ coincides with the group algebra of the symmetric group $S_k$. Let $I_{ih}$ be deformations of the subspaces $I_i$. In the paper we give a criteria for flatness of the corresponding deformations of the quadratic algebras $(V[[h]],J_{ih}$ and the quantum semigroup $M(V[[h]];I_{1h},...,I_{nh})$. It says that the deformations will be flat if the algebras $A_k(I_1,...,I_n)$ are semisimple and under the deformation their dimension does not change. Usually, the decomposition into $I_i$ is defined by a given Yang-Baxter operator $S$ on $V\otimes V$, for which $I_i$ are its eigensubspaces, and the deformations $I_{ih}$ are defined by a deformation $S_h$ of $S$. We consider the cases when $S_h$ is a deformation of Hecke or Birman-Wenzl symmetry, and also the case when $S_h$ is the Yang-Baxter operator which appears by a representation of the Drinfeld-Jimbo quantum group. Applying the flatness criteria we prove that in all these cases we obtain flat deformations of the quadratic algebras and the corresponding quantum semigroups.
Donin Joseph
Shnider Steve
No associations
LandOfFree
Deformations of quadratic algebras and the corresponding quantum semigroups does not yet have a rating. At this time, there are no reviews or comments for this scientific paper.
If you have personal experience with Deformations of quadratic algebras and the corresponding quantum semigroups, we encourage you to share that experience with our LandOfFree.com community. Your opinion is very important and Deformations of quadratic algebras and the corresponding quantum semigroups will most certainly appreciate the feedback.
Profile ID: LFWR-SCP-O-280203