Monomial methods in iterated local skew power series rings
Abstract
Let A = Fp or Zp, and let R = A[[x1]][[x2; σ2, δ2]]…[[xn;σn,δn]], an iterated local skew power series ring over A. Under mild conditions, we show that (multiplicative) monomial orders exist, and develop the theory of Gr\"obner bases for R. We show that all rank-2 local skew power series rings over Fp satisfy polynormality, and give an example of a rank-2 local skew power series ring over Zp which is a unique factorisation domain in the sense of Chatters-Jordan.
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