A note on rigidity and triangulability of a derivation
Abstract
Let A be a Q-domain, K=frac(A), B=A[n] and D∈ A(B). Assume rank D= rank DK=r, where DK is the extension of D to K[n]. Then we show that (i) If DK is rigid, then D is rigid. (ii) Assume n=3, r=2 and B=A[X,Y,Z] with DX=0. Then D is triangulable over A if and only if D is triangulable over A[X]. In case A is a field, this result is due to Daigle.
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