On the injectivity of certain homomorphisms between extensions of G(λ) by Gm over a Z(p)-algebra
Abstract
Let G(λ) be a formal group scheme which deforms Ga to Gm. And let (l):G(λ)→G(λpl) be the l-th Frobenius-type homomorphism determined by λ. We show that the homomorphism ((l)):H20(G(λpl),Gm)→ H20(G(λ),Gm) induced by (l) is injective over a Z(p)-algebra under a suitable restriction on λ. In this situation, the Cartier dual of Ker((l)), which is a finite group scheme of order pl, is described over a Z/(pn)-algebra.
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