Invertible Complex Measures on Euclidean Spaces

Abstract

In 1971 Taylor characterised all complex measures on R that are invertible with respect to convolution as those which can be written in the form δγ σ m () for some γ∈ R, some complex measure , some m∈ Z and a given fixed invertible finite signed measure σ (which has characteristic function R z (1+i z)/(1-i z)). We extend Taylor's result to complex measures on Rn. Somewhat surprisingly, the structure of invertible complex measures on Rn is not much more complicated than that of complex measures on R, in the sense that they can be represented as δγ σ1 m1 … σp mp () for some γ ∈ Rn, some complex measure and m1,…, mp∈ Z, where the σi correspond to σ in the one-dimensional case and actually live on 1-dimensional subspaces of Rn. Our proof relies on a general result of Taylor for invertible complex measures on locally compact abelian groups. To apply Taylor's result, we extend some existing results for C-valued functions to functions with values in a semisimple commutative unital Banach algebra with connected Gelfand space. The study of invertible complex measures on Rn has some impact on the theory of quasi-infinitely divisible probability distributions on Rn.