Infinitely many commuting operators for the elliptic quantum group Uq,p(slN)

Abstract

We construct two classes of infinitely many commuting operators associated with the elliptic quantum group Uq,p(slN). We call one of them the integral of motion Gm, (m ∈ N) and the other the boundary transfer matrix TB(z), (z ∈ C). The integral of motion Gm is related to elliptic deformation of the N-th KdV theory. The boundary transfer matrix TB(z) is related to the boundary Uq,p(slN) face model. We diagonalize the boundary transfer matrix TB(z) by using the free field realization of the elliptic quantum group, however diagonalization of the integral of motion Gm is open problem even for the simplest case Uq,p(sl2).