One generator algebras

Abstract

For R1,R2,R3,… a family of non isomorphic rings (or algebras) having each only 2 idempotents (1 and 0), we classify up to isomorphism the rings (or algebras) obtained by taking products of powers of the different Ri. We show that the automorphism groups of such rings (or algebras) split naturally into the product of wreath products Aut( Rn) Smn for different n. These results are applied to algebras generated by one element over a perfect field K. Such algebra is either K[X] or a quotient of K[X]. We show that in the later case the algebra is isomorphic to a finite product of the form A=Π (Li[X]/(Xj))ni,j, where the Li are non isomomorphic finite field extensions of K (not isomophic as K-algebras), with restrictions on the numbers ni,j if K is finite. We classify these algebras up to isomorphism. We have also that the K-algebra automorphism group of A=Π (Li[X]/(Xj))ni,j splits naturally into the product of wreat products AutK(Li[X]/(Xj) ) Sni,j (AutK(-) is for K-algebra automorphism group). Finally, we prove that AutK(Li[X]/(Xn) ) is isomorphic to the semi-direct product Gn(Li) AutK(Li) (AutK(-) is for K-algebra automorphism group), where Gn(Li) AutLi(Li[X]/(Xn) ) (Li algebra automorphism group) is an algebraic subgroup of invertible lower triangular matrices of dimension (n-1)× (n-1) with coefficients in Li; the conjugate of a matrix M∈ Gn(Li) by σ ∈ AutK(Li) is the matrix obtained from M by applying σ to its coefficients.

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