Simple tensor products
arXiv:0907.3002 · doi:10.1007/s00222-010-0256-9
Abstract
Let F be the category of finite dimensional representations of an arbitrary quantum affine algebra. We prove that a tensor product $S_1\otimes ... \otimes S_N$ of simple objects of F is simple if and only if for any $i < j$, $S_i\otimes S_j$ is simple.
21 pages ; accepted for publication in Inventiones Mathematicae