Paper detail

Quantum deformations of the restriction of $GL_{mn}(\C)$-modules to $GL_m(\C) \times GL_n(\C)$

In this paper, we consider the restriction of finite dimensional $GL_{mn} (\C)$-modules to the subgroup ${GL_m (\C)\times GL_n (\C)}$. In particular, for a Weyl module $V_λ (\C^{mn})$ of $U_q(gl_{mn})$ we construct a representation $W_λ$ of $U_q (gl_m)\otimes U_q (gl_n)$ such that at $q=1$, the restriction of $V_λ (\C^{mn})$ to $U_1 (gl_m)\otimes U_1 (gl_n)$ matches its action on $W_λ$ at $q=1$. Thus $W_λ$ is a $q$-deformation of the module $V_λ$. This is achieved by first constructing a $U_q (gl_m)\otimes U_q (gl_n)$-module $\wedge^k $, a $q$-deformation of the simple $GL_{mn} (\C)$-module $\wedge^k (\C^{mn})$. We also construct the bi-crystal basis for $\wedge^k $ and show that it consists of signed subsets. Next, we develop $U_q (gl_m) \otimes U_q (gl_n)$-equivariant maps $ψ_{a,b} :\wedge^{a+1} \otimes \wedge^{b-1} \to \wedge^a \otimes \wedge^b$. This is used as the building block to construct the general $W_λ$.