A Clebsch-Gordan decomposition in positive characteristic
Abstract
Let G be the special linear group of degree 2 over an algebraically closed field K. Let E be the natural module and SrE the rth symmetric power. We consider here, for r,s≥ 0, the tensor product of SrE and the dual of SsE. In characteristic zero this tensor product decomposes according to the Clebsch-Gordan formula. We consider here the situation when K is a field of positive characteristic. We show that each indecomposable component occurs with multiplicity one and identify which modules occur for given r and s.
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