GE2-rings and a graph of unimodular rows

Abstract

For a commutative ring A we consider a related graph, (A), whose vertices are the unimodular rows of length 2 up to multiplication by units. We prove that (A) is path-connected if and only if A is a GE2-ring, in the terminology of P. M. Cohn. Furthermore, if Y(A) denotes the clique complex of (A), we prove that Y(A) is simply connected if and only if A is universal for GE2. More precisely, our main theorem is that for any commutative ring A the fundamental group of Y(A) is isomorphic to the group K2(2,A) modulo the subgroup generated by symbols.