The biduality and reflexivity theorems are known to hold for projective varieties defined over fields of characteristic zero, and to fail in positive characteristic. In this article we construct a notion of reflexivity and biduality in positive characteristic by generalizing the ordinary tangent space to the notion of h-tangent spaces. The ordinary reflexivity theory can be recovered as the special case \(h = 0\), of our theory. Several varieties that are not ordinary reflexive or bidual become reflexive in our extended theory.
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