The Denominators of normalized R-matrices of types A2n-1(2), A2n(2), Bn(1) and Dn+1(2)
Abstract
Denominators of normalized R-matrices provide important information on finite dimensional representations over quantum affine algebras, and over quiver Hecke algebras by the generalized quantum affine Schur-Weyl duality functors. We compute the denominators of all normalized R-matrices between fundamental representations of types A2n-1(2), A2n(2), Bn(1) and Dn+1(2). Thus we can conclude that the normalized R-matrices of types A2n-1(2), A2n(2), Bn(1) have only simple poles, and of type Dn+1(2) have double poles under certain conditions.
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