Generation of the special linear group by elementary matrices in some measure Banach algebras

Abstract

For a commutative unital ring R, and n∈ N, let SLn(R) denote the special linear group over R, and En(R) the subgroup of elementary matrices. Let M+ be the Banach algebra of all complex Borel measures on [0,+∞) with the norm given by the total variation, the usual operations of addition and scalar multiplication, and with convolution. It is shown that SLn(A)=En(A) for Banach subalgebras A of M+ that are closed under the operation M+ μ μt, t∈ [0,1], where μt(E):=∫E (1-t)x dμ(x) for t∈ [0,1), and Borel subsets E of [0,+∞), and μ1:=μ(\0\)δ, where δ∈ M+ is the Dirac measure. Many illustrative examples of such Banach algebras A are given. An example of a Banach subalgebra A⊂ M+, that does not possess the closure property above, but for which SLn(A)=En(A) neverthess holds, is also given.