On the Cartier Duality of Certain Finite Group Schemes of order pn, II
Abstract
We explicitly describe the Cartier dual of the l-th Frobenius kernel Nl of the deformation group scheme, which deforms the additive group scheme to the multiplicative group scheme. Then the Cartier dual of Nl is given by a certain Frobenius type kernel of the Witt scheme. Here we assume that the base ring A is a Z(p)/(pn)-algebra, where p is a prime number. The obtained result generalizes a previous result by the author which assumes that A is a ring of characteristic p.
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