A note on partial coordinate system in a polynomial ring

Abstract

J. Berson, J. W. Bikker and A. van den Essen proved that for a non-zerodivisor a in a commutative ring R containing Q if the polynomials f1,…,fn-1 in R[X1,…,Xn] form a partial coordinate system over the rings Ra and RaR then f1,…,fn-1 form a partial coordinate system over the ring R. In this note we show that the theory of residual variables of Bhatwadekar-Dutta and its recent extension by Das-Dutta, extends their result to the case when a is an arbitrary element of A.