Projective modules over overrings of polynomial rings and a question of Quillen

Abstract

Let (R,,K) be a regular local ring containing a field k such that either char k=0 or char k=p and tr-deg K/p≥ 1. Let g1,…,gt be regular parameters of R which are linearly independent modulo 2. Let A=Rg1·s gt [Y1,…,Ym,f1(l1)-1,…, fn(ln)-1], where fi(T)∈ k[T] and li=ai1Y1+…+aimYm with (ai1,…,aim)∈ km-(0). Then every projective A-module of rank ≥ t is free. Laurent polynomial case fi(li)=Yi of this result is due to Popescu.