Homomorphisms of algebraic groups: representability and rigidity
Abstract
Given two algebraic groups G, H over a field k, we investigate the representability of the functor of morphisms (of schemes) Hom(G,H) and the subfunctor of homomorphisms (of algebraic groups) Hom gp(G,H). We show that Hom(G,H) is represented by a group scheme, locally of finite type, if the k-vector space O(G) is finite-dimensional; the converse holds if H is not \'etale. When G is linearly reductive and H is smooth, we show that Hom gp(G,H) is represented by a smooth scheme M; moreover, every orbit of H acting by conjugation on M is open.
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