Standard Bases in mixed Power Series and Polynomial Rings over Rings

Abstract

In this paper we study standard bases for submodules of a mixed power series and polynomial ring R[[t1,…,tm]][x1,…,xn]s respectively of their localization with respect to a t-local monomial ordering for a certain class of noetherian rings R. The main steps are to prove the existence of a division with remainder generalizing and combining the division theorems of Grauert--Hironaka and Mora and to generalize the Buchberger criterion. Everything else then translates naturally. Setting either m=0 or n=0 we get standard bases for polynomial rings respectively for power series rings over R as a special case.