An Elimination Lemma for Algebras with PBW Bases

Abstract

Let K be a field, and A=K[a1,… ,an] a finitely generated K-algebra with the PBW K-basis B=\a1α1·s anαn~|~(α1,… ,αn)∈Nn\. It is shown that if L is a nonzero left ideal of A with GK.dim(A/L)=d<n (= the number of generators of A), then L has the elimination property in the sense that V(U) L \0\ for every subset U=\ ai1,… ,aid+1\⊂\a1,… ,an\ with i1<i2<·s <id+1, where V(U)=K-span\ai1α1·s aid+1αd+1~|~(α1,… ,αd+1)∈Nd+1\. In terms of the structural properties of A, it is also explored when the condition GK.dim(A/L)<n may hold for a left ideal L of A. Moreover, from the viewpoint of realizing the elimination property by means of Gr\"obner bases, it is demonstrated that if A is in the class of binomial skew polynomial rings [G-I2, Serdica Math. J., 30(2004)] or in the class of solvable polynomial algebras [K-RW, J. Symbolic Comput., 9(1990)], then every nonzero left ideal L of A satisfies GK.dim(A/L)< GK.dimA=n (= the number of generators of A), thereby L has the elimination property.