Unimodular rows over monoid extensions of overrings of polynomial rings

Abstract

Let R be a commutative Noetherian ring of dimension d and M a commutative cancellative torsion-free seminormal monoid. Then (1) Let A be a ring of type R[d,m,n] and P be a projective A[M]-module of rank r ≥ max\2,d+1\. Then the action of E(A[M] P) on Um(A[M] P) is transitive and (2) Assume (R, m, K) is a regular local ring containing a field k such that either char k=0 or char k = p and tr-deg K/Fp ≥ 1. Let A be a ring of type R[d,m,n]* and f∈ R be a regular parameter. Then all finitely generated projective modules over A[M], A[M]f and A[M] R R(T) are free. When M is free both results are due to Keshari and Lokhande.