Quantized universal enveloping algebras, the Yang-Baxter equation and invariants of links, I

Arun Ram
Department of Mathematics and Statistics
University of Melbourne
Parkville, VIC 3010 Australia
aram@unimelb.edu.au

Last update: 2 June 2014

Notes and References

This is a typed copy of the LOMI preprint Quantized universal enveloping algebras, the Yang-Baxter equation and invariants of links, I by N.Yu. Reshetikhin.

Recommended for publication by the Scientific Council of Steklov Mathematical Institute, Leningrad Department (LOMI) 6, June, 1987.

The solutions of Yang-Baxter equation connected with the $q -deformations$ of universal enveloping algebras of simple Lie algebras

The $q -deformation$ of the universal enveloping algebras (or quantum universal enveloping algebras QUEA) $U_{q} (𝔤)$ arose when studying some special class of integrable systems. The definition of $U_{q} (𝔤)$ for any simple Lie algebra $𝔤$ was given in [Dri1985,Dri1986-3,Jim1985]. One can define these algebras by generators and relations.

Definition 1.1 [Dri1985,Dri1986-3,Jim1985]. QUEA $U_{q} (𝔤)$ is the algebra with generators $X_{i}^{\pm},$ $H_{i},$ $i = 1, \dots, r = rank 𝔤$ and with the relations: $\begin{matrix} [H_{i}, H_{j}] = 0, [H_{j}, X_{i}^{\pm}] = \pm (α_{j} α_{i}) X_{i}^{\pm} & (1.1) \\ [X_{i}^{+}, X_{j}^{-}] = δ_{i j} \frac{sh (\frac{h}{2} H_{i})}{sh (\frac{h}{2})}, q = e^{h} & (1.2) \\ i \neq j, \sum_{k = 0}^{n} {(- 1)}^{k} {(\binom{n}{k})}_{q_{i}} q_{i}^{- \frac{k (n - k)}{2}} {(X_{i}^{\pm})}^{k} X_{j}^{\pm} {(X_{i}^{\pm})}^{n - k} = 0, q_{i} = q^{\frac{(α_{i} α_{i})}{2}} & (1.3) \end{matrix}$ where $A_{i j}$ is the Cartan matrix of $𝔤,$ $(α, β)$ is the scalar product of the roots $(A_{i j} = (α_{i} α_{j}) (α_{j} α_{j})),$ $n = 1 - A_{i j},$ $i \neq j .$

The generators $X_{i}^{\pm},$ $H_{i}$ play the role of Chevalley basis in $U (𝔤) .$ The elements $H_{i}$ form the commutative subalgebra $U (f) \subset U_{q} (𝔤) .$ This subalgebra is the analog of Cartan subalgebra in $U (𝔤) .$ The elements $H_{i}$ correspond to the simple roots of $𝔤 .$ Let $α = \sum_{i = 1}^{r} n_{i} α_{i}$ be the root of $𝔤,$ a corresponding element of $f$ we denote as $H_{α} = \sum_{i = 1}^{r} n_{i} H_{i} .$

Theorem 1.1 [Dri1985,Dri1986-3,Jim1985]. The algebra $U_{q} (𝔤)$ is the Hopf algebra [Abe1980] (see also Appendix A) with comultiplication and with the antipode $γ$ defined on the generators by the following formulae: $\begin{matrix} Δ (H_{i}) = H_{i} \otimes 1 + 1 \otimes H_{i}, & (1.4) \\ Δ (X_{i}^{\pm}) = X_{i}^{\pm} \otimes e^{\frac{h}{4} H_{i}} + e^{- \frac{h}{4} H_{i}} \otimes X_{i}^{\pm}, & (1.5) \\ γ (H_{i}) = - H_{i}, γ (X_{i}^{\pm}) = - e^{\frac{h}{2} ρ} X_{i}^{\pm} e^{- \frac{h}{2} ρ}, & (1.6) \end{matrix}$ where $ρ = \frac{1}{2} \sum_{α \in Δ_{+}} H_{α}$ is the element of $f$ and $Δ_{+}$ is the positive roots of $𝔤 .$

The parameter $q$ is the deformation parameter. At $q = 1$ the algebra $U_{q} (𝔤)$ is the universal enveloping algebra of $𝔤 .$ For simple Lie algebras of the algebras $U_{q} (𝔤)$ are simple for general $q .$ The special values of $q$ are situated in the rational points on the unit circle.

Let $𝔟_{\pm} \subset 𝔤$ be the Borel subalgebras in $𝔤 .$ The algebras $U_{q} (𝔟_{+})$ and $U_{q} (𝔟_{-})$ with generators $(H_{i}, X_{i}^{+})$ and $(H_{i}, X_{i}^{-})$ are the Hopf subalgebras in $U_{q} (𝔤) .$ There is a duality between $U_{q} (𝔟_{+})$ and $U_{q} (𝔟_{-}) .$ Let ${e_{s}}$ is the basis in $U_{q} (𝔟_{-})$ and ${e^{s}}$ be the dual basis in $U_{q} (𝔟_{+}) .$

It is not difficult to prove that the map $σ \circ Δ : U_{q} (𝔤) \to U_{q} (𝔤) \otimes U_{q} (𝔤),$ where $σ$ is the permutation in $U_{q} (𝔤) \otimes U_{q} (𝔤)$ also defines the structure of Hopf algebra on $U_{q} (𝔤)$ with antipode $γ' = γ^{- 1} .$

Theorem 1.2 [Dri1985,Dri1986-3]. The comultiplication $Δ$ and $σ \circ Δ$ are connected by the following relation $\begin{matrix} σ \circ Δ (a) = R Δ (a) R^{- 1} \forall a \in U_{q} (𝔤) & (1.7) \end{matrix}$ where $σ$ is the permutation operator in $U_{q} (𝔤) \otimes U_{q} (𝔤)$ and $R = \sum_{s} e_{s} \otimes e^{s} \in U_{q} (𝔤) \otimes U_{q} (𝔤) .$

The proof of this theorem the following one is based on the construction of double Hopf algebra [Jim1985].

Theorem 1.3. The element $R$ satisfies the relations $\begin{matrix} (Δ \otimes id) R = R_{13} R_{23}, & (1.8a) \\ (id \otimes Δ) R = R_{13} R_{12}, & (1.8b) \\ R_{12} R_{13} R_{23} = R_{23} R_{13} R_{12}, & (1.8c) \\ (id \otimes γ) R = R^{- 1} . & (1.8d) \end{matrix}$ Here $R_{12}, R_{13}, R_{23} \in U_{q} {(𝔤)}^{\otimes 3},$ $R_{12} = e_{s} \otimes e^{s} \otimes 1,$ $R_{13} = e_{s} \otimes 1 \otimes e^{s},$ $R_{23} = 1 \otimes e_{s} \otimes e^{s} .$

Proof.

Let $m, μ$ and $γ$ be the matrices of multiplication, comultiplication and antipode in algebra $U_{q} (𝔟_{-}) :$ $e_{s} e_{t} = m_{s t}^{τ} e_{τ}, Δ (e_{s}) = μ_{s}^{t τ} e_{t} \otimes e_{τ}, γ (e_{s}) = γ_{s}^{t} e_{t} .$ The matrices $μ, m'$ and $γ^{- 1}$ are the matrices of multiplication, comultiplication and antipode in $U_{q} (𝔟_{+}) :$ $e^{s} e^{t} = μ_{τ}^{s t} e^{τ}, Δ (e^{s}) = m_{t τ}^{s} e^{τ} \otimes e^{t}, γ (e^{s}) = {(γ^{- 1})}_{t}^{s} e^{t} .$ From (1.7) we have the commutation relations between the elements $e^{s}$ and $e_{t}$ in $U_{q} (𝔤) :$ $μ_{s}^{p q} m_{t p}^{τ} e^{t} e_{q} = μ_{s}^{p q} m_{q t}^{τ} e_{p} e^{t} .$ From this commutation relations and from the definition of $R$ follows (1.8c). To prove (1.8d) we use the definition of antipode (A.): $R (id \otimes γ) R = e_{s} e^{t} \otimes e^{s} γ (e^{t}) = m_{s t}^{τ} e_{τ} \otimes γ_{p}^{t} μ_{q}^{s p} e^{q} = m_{s t}^{τ} γ_{p}^{t} μ_{q}^{s p} e_{τ} \otimes e^{q} = e \otimes e .$ Similarly $(id \otimes γ) (R) \cdot R = m_{s t}^{τ} γ_{p}^{s} μ_{q}^{p t} e_{τ} \otimes e^{q} = e \otimes e .$ The following formulae prove the relations (1.8a) and (1.8b) $\begin{matrix} (Δ \otimes id) R = Δ (e_{s}) \otimes e^{s} = μ_{s}^{τ t} e_{τ} \otimes e_{t} \otimes e^{s} = e_{τ} \otimes e_{t} \otimes e^{τ} e^{t} = R_{13} R_{23}, \\ (id \otimes Δ) R = e_{s} \otimes Δ (e^{s}) = e_{s} \otimes m_{τ t}^{s} e^{t} \otimes e^{τ} = e_{τ} e_{t} \otimes e^{t} \otimes e^{τ} = R_{13} R_{12} . \end{matrix}$ The theorem is proved.

$□$

The algebras $U_{q} (𝔤)$ and $𝔤$ have a common Cartan subalgebra $f$ generated by the elements $H_{i} .$ This means that the theories of the finite dimensional representations of $U_{q} (𝔤)$ and $𝔤$ are quite parallel. The following two statements will play the main role in the text.

Proposition 1.1. The finite dimensional representations of $U_{q} (𝔤)$ are completely irreducible.

Proposition 1.2.

(a)	The irreducible finlte-dimensional representations (IFR) of $U_{q} (𝔤)$ are parametrized by the highest weights $λ$ of the algebra $𝔤 .$
(b)	Any irreducible finite dimensional module $V^{λ}$ is decomposed into the sum of the weight spaces $V^{λ} = ⨁_{μ} V^{λ} (μ)$ and the dimensions of $V^{λ} (μ)$ are the same as for IFR of $𝔤 .$

From the complete irreducibility of finite dimensional representations of $U_{q} (𝔤)$ it follows that any IFR can be considered as some irreducible component of corresponding tensorial power of basic representations. The list of basic representation is given in table 1. $\begin{matrix} \begin{matrix} 𝔤 category & A_{n} & B_{n} & C_{n} & D_{n} & G_{2} & E_{6} & E_{7} & E_{8} & F_{4} \\ finite dimensional & ω_{1} & ω_{1} & ω_{1} & ω_{1} & ω_{1} & ω_{1} & ω_{7} & ω_{8} & ω_{4} \\ tensorial represent & - & ω_{n} & - & ω_{1}, ω_{n} & - & - & - & - & - \end{matrix} \\ Table 1 \end{matrix}$

For algebras $B_{n}$ and $D_{n}$ it is natural to separate from the finite dimensional representations the category of tensorial representations (with integers highest weights). In this category the basic representation is vectorial representation with h.w. $ω_{1}$ in both cases.

It is very important for our purposes that all finite dimensional representations of $U_{q} (𝔤)$ are contained in tensorial powers of the basic representations.

Below we study the restrictions of universal $R -matrices$ on the IFR's. If $ρ_{λ}$ and $ρ_{μ}$ are IFR of $U_{q} (𝔤)$ and $P^{λ μ}$ is the permutation operator on $V^{λ} \otimes V^{μ}$ $(P^{λ μ} : V^{λ} \otimes V^{μ} \to V^{μ} \otimes V^{λ},$ $P^{λ μ} (f \otimes g) = g \otimes f)$ then we denote the matrix $P^{λ μ} (ρ_{λ} \otimes ρ_{μ}) (R)$ as $R^{λ μ}$ and we call it the $R -matrix$ in $λ, μ$ representation (or $λ, μ$ $R -matrix).$ This matrix map $V^{λ} \otimes V^{μ}$ on $V^{μ} \otimes V^{λ}$ and satisfies the following relations: $\begin{matrix} (R^{λ μ} \otimes I) (I \otimes R^{ν μ}) (R^{ν λ} \otimes I) = (I \otimes R^{ν λ}) (R^{ν μ} \otimes I) (I \otimes R^{λ μ}) . & (1.9) \end{matrix}$ The left and the right sides of these relations act from $V^{ν} \otimes V^{λ} \otimes V^{μ}$ to $V^{μ} \otimes V^{λ} \otimes V^{ν} .$

To find the matrices $R^{λ μ}$ one can use two ways. The first one is the explicit projection of the universal $R -matrix$ by factorising both copies of $U_{q} (𝔤)$ over corresponding ideals. The second way uses the complete irreducibility of IFR of $U_{q} (𝔤) .$ Because all of IFR are contained in tensorial powers of basic representations of $U_{q} (𝔤)$ one can construct the matrices $R^{λ μ}$ from a tensorial product of the $R -matrices$ acting in basic representations. The second way gives also the important relations between the matrices $R^{λ μ}$ and we will use this way below.

Consider a Cartan antiinvolution in $U_{q} (𝔤)$ $θ (X_{i}^{\pm}) = X_{i}^{\mp}, θ (H_{i}) = H_{i}$ and automorphism $δ$ corresponding to on authomorphism of Dynkin diagram: $δ (X_{i}^{\pm}) = X_{i^{*}}^{\pm}, δ (H_{i}) = H_{i^{*}} .$

We define a $q -analog$ $C$ of the element with the maximal length of the Weyl group by the formula $γ = δ \circ {Ad}_{C} \otimes θ .$

It is not difficult to check that in basic representations the element $C$ has the form $C = S q^{ρ / 2}$ where $S$ is the corresponding element of the Weyl group for $U (𝔤) .$

(b) The element $R$ satisfies the relation $(id \otimes δ) (R^{- 1}) = (1 \otimes C) (id \otimes θ) (R) (1 \otimes C^{- 1}) .$

Definition 1.2. If $V^{ν} \subset V^{λ} \otimes V^{μ},$ the projection matrix $K_{ν}^{λ μ} (q, a) : V^{λ} \otimes V^{μ} \to V^{ν}$ is called the matrix of Klebsch-Gordan coefficient (KGC) (here index $a$ numbers the components $V^{ν}$ in $V^{λ} \otimes V^{μ}$ if the multiplicity of $V^{ν}$ is more than one).

The matrices $K_{ν}^{λ μ}$ and $K_{ν}^{μ λ}$ are orthogonal if $ν \neq ν' .$ They are normalized when $mult (V^{ν}) = mult (V^{ν}) = 1$ $\begin{matrix} K_{ν}^{λ μ} {(K_{ν'}^{μ λ})}^{⊤} = δ_{ν ν'} I_{ν} . & (1.14) \end{matrix}$

Theorem 1.4. The matrices $R^{λ μ}$ and $K_{ν}^{λ μ}$ for $mult (V^{ν}) = 1$ satisfy the following relations $\begin{matrix} P^{μ λ} R_{(q)}^{λ μ} P^{μ λ} & = & S \otimes S R_{(q)}^{μ λ} s^{- 1} \otimes s^{- 1} = R^{λ μ} {(q^{- 1})}^{- 1}, & (1.15) \\ C^{- 1} K_{ν}^{λ μ} (q) (C \otimes C) & = & {(- 1)}^{\overline{ν}} K_{ν^{*}}^{λ^{*} μ^{*}} (q^{- 1}), & (1.16) \\ K_{ν}^{λ μ} (q) P^{μ λ} & = & {(- 1)}^{\overline{ν}} K_{ν}^{μ λ} (q^{- 1}), & (1.17) \\ R^{λ μ} {(q)}^{⊤} & = & R^{λ μ} (q) . & (1.18) \end{matrix}$

Here $\overline{ν} = 0, 1$ is the parity of $V^{ν}$ in $V^{λ} \otimes V^{μ}$ and $⊤$ is the transposition.

Following theorems are the keys ones to study the matrices $R^{λ μ} .$

Theorem 1.5. Let $V^{ν} \subset V^{λ} \otimes V^{μ}$ and $mult (V^{ν}) = 1$ then $\begin{matrix} R^{λ μ} (q) {(K_{ν}^{λ μ} (q))}^{⊤} & = & {(- 1)}^{\overline{ν}} q^{\frac{c (ν) - c (λ) - c (μ)}{4}} K_{ν}^{μ λ} {(q)}^{⊤} & (1.19) \\ K_{ν}^{μ λ} (q) R^{λ μ} (q) & = & {(- 1)}^{\overline{ν}} q^{\frac{c (ν) - c (λ) - c (μ)}{4}} K_{ν}^{λ μ} (q) & (1.20) \end{matrix}$ where $\overline{ν}$ is the parity of $V^{ν}$ in $V^{λ} \otimes V^{μ}$ and $c (ν)$ is the value of Casimir operator of $𝔤$ on the irreducible representation with highest weight $ν :$ $\begin{matrix} c = \sum_{i = 1}^{r} H^{i^{2}} + \sum_{α \in Δ} X_{α} X_{- α}, H^{i} = (H, ω^{i}) & (1.21) \\ c (ν) = ν^{2} + 2 ρ ν . & (1.22) \end{matrix}$

Proof.

From the definition of universal $R -matrix$ follows the equality $\begin{matrix} R^{λ μ} Δ^{λ μ} (a) = Δ^{μ λ} (a) R^{λ μ} & (1.23) \end{matrix}$ where $Δ^{λ μ} (a) = (ρ^{λ} \otimes ρ^{μ}) Δ (a) .$ The representation $Δ^{λ μ}$ is reducible and $K_{ν}^{λ μ}$ are the projectors on the irreducible components: $\begin{matrix} Δ^{λ μ} (a) {K_{ν}^{λ μ}}^{⊤} & = & {K_{ν}^{λ μ}}^{⊤} ρ^{ν} (a) & (1.24) \\ Δ^{μ λ} (a) {K_{ν}^{μ λ}}^{⊤} & = & {K_{ν}^{μ λ}}^{⊤} ρ^{ν} (a) . & (1.25) \end{matrix}$ From (1.23) and (1.24) we have $\begin{matrix} R^{λ μ} {K_{ν}^{λ μ}}^{⊤} ρ_{ν} (a) = Δ^{μ λ} (a) R^{λ μ} {K_{ν}^{λ μ}}^{⊤} . & (1.26) \end{matrix}$ Comparing with (1.25) we obtain $\begin{matrix} R^{λ μ} {K_{ν}^{λ μ}}^{⊤} = R_{ν} (q) {K_{ν}^{μ λ}}^{⊤} & (1.27) \end{matrix}$ where $R_{ν} (q)$ is some function of $q, λ, μ, ν .$ To find $R_{ν} (q)$ we consider the limit $q \to 1 .$ Let $φ_{ν}^{λ μ} (q)$ be the highest weight vector in $V^{ν} \subset V^{λ} \otimes V^{μ} .$ From (1.27) follows the equality $\begin{matrix} R^{λ μ} (q) φ_{ν}^{λ μ} (q) = R_{ν} (q) φ_{ν}^{μ λ} (q) . & (1.28) \end{matrix}$ At $q \to 1$ we have $\begin{matrix} R^{λ μ} & = & P^{λ μ} (1 + (q - 1) τ + O ({(q - 1)}^{2})), & (1.29) \\ τ & = & \frac{1}{2} \sum_{i} H^{i} \otimes H^{i} + \sum_{α \in Δ_{+}} X_{α} \otimes X_{- α} & (1.30) \\ φ_{ν}^{λ μ} (q) & = & φ^{λ μ} + (q - 1) ψ_{ν}^{λ μ} + O ({(q - 1)}^{2}), & (1.31) \\ R_{ν} (q) & = & {(- 1)}^{\overline{ν}} (1 + (q - 1) s_{ν} + O ({(q - 1)}^{2})) . & (1.32) \end{matrix}$ Here $τ \in 𝔤 \otimes 𝔤$ $(𝔤 ↪ U (𝔤))$ is the so-called classical $τ -matrix$ [Bax1982,Fad1984]. $φ_{ν}^{λ μ}$ is the h.w.v. of $𝔤,$ and $ψ_{ν}^{λ μ}$ and $s_{ν}$ some unknown vectors and constants.

Theorem 1.4 implies symmetry relations for $φ_{ν}^{λ μ}$ and $ψ_{ν}^{λ μ} :$ $\begin{matrix} P^{λ μ} φ_{ν}^{λ μ} = {(- 1)}^{\overline{ν}} φ_{ν}^{μ λ}, P^{λ μ} ψ_{ν}^{λ μ} = {(- 1)}^{\overline{ν} + 1} ψ_{ν}^{μ λ} . & (1.33) \end{matrix}$ Comparing the coefficients at $(q - 1)$ in (1.28) we obtain the equation for $s_{ν} :$ $P^{λ μ} τ φ_{ν}^{λ μ} + P^{λ μ} ψ_{ν}^{λ μ} = {(- 1)}^{\overline{ν}} ψ_{ν}^{μ λ} + {(- 1)}^{\overline{ν}} s_{ν} φ_{ν}^{μ λ} .$ Multiplying this equality by ${(φ_{ν}^{μ λ})}^{⊤}$ from the left and using the symmetry relations (1.33) we obtain the following expression for $s_{ν}$ $s_{ν} = {(φ_{ν}^{λ μ})}^{⊤} τ φ_{ν}^{λ μ} .$

Using the symmetry relations (1.33) and the property of highest weight vectors the value of $s_{ν}$ one can express through the Casimir operators $\begin{matrix} s_{ν} = \frac{1}{4} (c (ν) - c (λ) - c (μ)) . & (1.34) \end{matrix}$

From the symmetry relations (1.15) and from the definition of $R^{λ μ}$ we have $\begin{matrix} R_{ν} (q) R_{ν} (q^{- 1}) = 1 & (1.35) \\ R_{ν} (q) ≃ {(- 1)}^{\overline{ν}} q^{α}, q \to \infty . & (1.36) \end{matrix}$

Moreover, the function $R_{ν} (q)$ has no poles and zeros for finite values of $q .$ From Liouville theorem follows that there is only one function $R_{ν} (q)$ satisfying the relations (1.29), (1.34)-(1.36) $R_{ν} (q) = {(- 1)}^{\overline{ν}} q^{\frac{c (ν) - c (λ) - c (μ)}{4}} .$

The equality (1.20) is the transposition of (1.19). The Theorem is proved.

$□$

Consequence. When all irreducible components in $V^{λ} \otimes V^{μ}$ have the multiplicity equal to one the matrices $R^{λ μ}$ and ${(R^{λ μ})}^{- 1}$ have the following decompositions: $\begin{matrix} R^{λ μ} (q) & = & \sum_{ν \in λ \otimes μ} {(- 1)}^{\overline{ν}} q^{\frac{c (ν) - c (λ) - c (μ)}{4}} P_{ν}^{λ μ} (q) & (1.37) \\ {(R^{λ μ} (q))}^{- 1} & = & \sum_{ν \in λ \otimes μ} {(- 1)}^{\overline{ν}} q^{- \frac{c (ν) - c (λ) - c (μ)}{4}} P_{ν}^{μ λ} (q) & (1.38) \end{matrix}$ where $\begin{matrix} P_{ν}^{λ μ} (q) = K_{ν}^{μ λ} {(q)}^{⊤} K_{ν}^{λ μ} (q) . & (1.39) \end{matrix}$ These $R -matrices$ will be called $R -matrices$ with simple spectrum.

Let us consider the space $V^{τ} \otimes V^{λ} \otimes V^{μ}$ and the matrices $R_{12}^{τ λ} = R^{τ λ} \otimes 1 : V^{τ} \otimes V^{λ} \otimes V^{μ} \to V^{λ} \otimes V^{τ} \otimes V^{μ},$ $R_{23}^{τ μ} = 1 \otimes R^{τ μ} : V^{λ} \otimes V^{τ} \otimes V^{μ} \to V^{λ} \otimes V^{μ} \otimes V^{τ},$ ${(K_{ν}^{λ μ})}_{23} = 1 \otimes K_{ν}^{λ μ} : V^{τ} \otimes V^{λ} \otimes V^{μ} \to V^{τ} \otimes V^{ν},$ ${(K_{ν}^{λ μ})}_{12} = K_{ν}^{λ μ} \otimes 1 : V^{λ} \otimes V^{μ} \otimes V^{τ} \to V^{ν} \otimes V^{τ},$ $R^{τ ν} : V^{τ} \otimes V^{ν} \to V^{ν} \otimes V^{τ}$ and similar matrices $R_{23}^{μ τ},$ $R_{12}^{λ τ},$ ${(K_{ν}^{λ μ})}_{23},$ ${(K_{ν}^{λ μ})}_{23},$ ${(K_{ν}^{λ μ})}_{12},$ $R^{ν τ} .$

Theorem 1.6. The matrices introduced above satisfy the following relations $\begin{matrix} R^{τ ν} {(K_{ν}^{λ μ})}_{23} & = & {(K_{ν}^{λ μ})}_{12} R_{23}^{τ μ} R_{12}^{τ λ}, & (1.40) \\ R^{ν τ} {(K_{ν}^{λ μ})}_{12} & = & {(K_{ν}^{λ μ})}_{23} R_{12}^{λ τ} R_{23}^{μ τ} . & (1.41) \end{matrix}$

Proof.

The restriction or the relation (1.6) on the irreducible representation gives: $\begin{matrix} \sum_{s} (ρ_{ν} (e_{s}) \otimes ρ τ (e^{s})) (K_{ν}^{λ μ} \otimes I) = (K_{ν}^{λ μ} \otimes I) \sum_{s, t} ρ_{λ} (e_{t}) \otimes ρ_{μ} (e_{s}) \otimes ρ_{τ} (e^{t} e^{s}) . & (1.42) \end{matrix}$ Multiplying this formula by the permutation operator $P^{ν τ} : V^{ν} \otimes V^{τ} \to V^{τ} \otimes V^{ν}$ from the left and using the equality $P^{ν τ} (K_{ν}^{λ μ} \otimes I) P_{13} P_{23} = I_{τ} \otimes K_{ν}^{λ μ}$ we obtain (1.41). The relation (1.40) is proved similarly.

$□$

Crossing-symmetry of the universal $R -matrices$ (1.8d) implies crossing-symmetry of the matrices $R^{λ μ}$ and $K_{ν}^{λ μ} :$

Theorem 1.7. The matrices $R^{λ μ}$ and $K_{ν}^{λ μ}$ satisfy the following crossing-symmetry relations: $\begin{matrix} {(P^{μ λ} R^{λ μ})}^{?} & = & (C \otimes 1) {(P^{μ λ} R^{λ μ})}^{t_{1}} (C^{- 1} \otimes I) & (1.43) \\ \sum_{j} {(K_{ν}^{λ μ})}_{k}^{i j} {(C)}_{j}^{ℓ} & = & \sqrt{\frac{χ_{λ}}{χ_{ν}}} {(K_{λ}^{ν μ^{*}})}_{i}^{k ℓ} & (1.44) \\ \sum_{i} {(K_{ν}^{λ μ})}_{k}^{i j} {(C)}_{i}^{ℓ} & = & \sqrt{\frac{χ_{μ}}{χ_{ν}}} {(K_{μ}^{λ^{*} ν})}_{j}^{ℓ k} & (1.45) \end{matrix}$ where $t_{1}$ is transposition over the first space, $λ^{*}$ is the highest weight (h.w.) vector conjugated with $λ$ by Carton automorphism, $\begin{matrix} C = S q^{- \frac{ρ}{2}}, χ_{λ} = {tr}_{V^{λ}} (q^{- ρ}) . & (1.46) \end{matrix}$

Using the explicit formula for coproduct in it is not difficult to prove the first statement of the following theorem.

Theorem 1.8.

(a)

The matrix

\begin{matrix} {(K^{λ λ^{*}})}^{i j} = \frac{1}{\sqrt{χ_{λ}}} C^{j i} & (1.47) \end{matrix}

is the projector on

ω

the one-dimensional subrepresentation in

V^{λ} \otimes V^{λ^{*}} .

(b)

The matrices

R^{λ λ^{*}}

and

R^{λ λ}

satisfy the relations

\begin{matrix} R^{λ λ^{*}} {(K^{λ λ^{*}})}^{⊤} & = & q^{- \frac{c (λ)}{2}} {(- 1)}^{[λ]} {(K^{λ^{*} λ})}^{⊤} & (1.48) \\ {tr}_{2} ((I \otimes q^{- ρ}) {(R^{λ λ})}^{\pm 1}) & = & q^{\pm \frac{c (λ)}{2}} \cdot I . & (1.49) \end{matrix}

Here

[λ] = 0, 1,

{tr}_{2}

is the matrix trace over the second space in

V^{λ} \otimes V^{λ} .

The proof of the second statement of this theorem is given in the next section, where we introduce graphical representation for the $R -matrices$ and for KGC.

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