On Lie algebra modules which are modules over semisimple group schemes
Abstract
Let p be a prime. Given a split semisimple group scheme G over a normal integral domain R which is a faithfully flat Z(p)-algebra, we classify all finite dimensional representations V of the fiber GK of G over K:=Frac(R) with the property that the set of lattices of V with respect to R which are G-modules is as well the set of lattices of V with respect to R which are Lie(G)-modules. We apply this classification to get a general criterion of extensions of homomorphisms between reductive group schemes over Spec K to homomorphisms between reductive group schemes over Spec R. We also show that for a simply connected semisimple group scheme over a reduced Q--algebra, the category of its representations is equivalent to the category of representations of its Lie algebra.
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