Isomorphism problems and groups of automorphisms for Ore extensions K[x][y; fddx ] (prime characteristic)

Abstract

Let (f) = K[x][y; fddx ] be an Ore extension of a polynomial algebra K[x] over an arbitrary field K of characteristic p>0 where f∈ K[x]. For each polynomial f, the automorphism group of the algebras (f) is explicitly described. The automorphism group AutK( (f))=S Gf is a semidirect product of two explicit groups where Gf is the eigengroup of the polynomial f (the set of all automorphisms of K[x] such that f is their common eigenvector). For each polynomial f, the eigengroup Gf is explicitly described. It is proven that every subgroup of AutK(K[x]) is the eigengroup of a polynomial. It is proven that the Krull and global dimensions of the algebra (f) are 2. The prime, completely prime, primitive and maximal ideals of the algebra (f) are classified.