Simultaneous Stabilization in AR(D)

Abstract

In this note we study the problem of simultaneous stabilization for the algebra A(). Invertible pairs (fj,gj), j=1,..., n, in a commutative unital algebra are called simultaneously stabilizable if there exists a pair (α,β) of elements such that α fj+β gj is invertible in this algebra for j=1,..., n. For n=2, the simultaneous stabilization problem admits a positive solution for any data if and only if the Bass stable rank of the algebra is one. Since A() has stable rank two, we are faced here with a different situation. When n=2, necessary and sufficient conditions are given so that we have simultaneous stability in A(). For n≥ 3 we show that under these conditions simultaneous stabilization is not possible and further connect this result to the question of which pairs (f,g) in A()2 are totally reducible; that is, for which pairs do there exist two units u and v in A() such that uf+vg=1.