Reduction of the Manin map modulo p

Abstract

For an abelian variety A over a function field K of characteristic zero, Manin defined a remarkable additive map A(K) V, where V is a vector space over K. We define an analogue of this map in the case of function fields of characteristic p. We then prove that the reduction modulo p of the Manin map in characteristic zero is the derivative of the Manin map in characteristic p and that the kernel of the Manin map in characteristic p is the group of points divisible by p.

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