Some perspective on Homotopy obstructions

Abstract

Throughout A will denote commutative noetherian ring, with A=d≥ 2, and P denote a projective A-module with rank(P)=n. In MM1 we considered the Homotopy obstruction sets π0( LO(P)), which has a structure of an abelian monoid, under suitable regularity and other conditions. In this article, we provide some perspective on these sets π0( LO(P)). Under similar regularity and other conditions, we prove if P, Q are two projective A-modules, with rank(P)=rank(Q)=d and (P) Q, then π0( LO(Q)) π0( LO(P)). Further, for any projective A-module P with rank(P)=n, we define a natural set theoretic map π0( LO(P))→ CHn(A), where CHn(A) Chow groups of codimension n cycles.