Noether's normalization in skew polynomial rings

Abstract

We study Noether's normalization lemma for finitely generated algebras over a division algebra. In its classical form, the lemma states that if I is a proper ideal of the ring R=F[t1,…,tn] of polynomials over a field F, then the quotient ring R/I is a finite extension of a polynomial ring over F. We prove that the lemma holds when R=D[t1,…,tn] is the ring of polynomials in n central variables over a division algebra D. We provide examples demonstrating that Noether's normalization may fail for the skew polynomial ring D[t1,…,tn;σ1,…,σn] with respect to commuting automorphisms σ1,…,σn of D. We give a sufficient condition for σ1,…,σn under which the normalization lemma holds for such ring. In the case where D=F is a field, this sufficient condition is proved to be necessary.

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