Amol Sasane

Copyright © 2008 Amol Sasane. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

Abstract

Let ℂ≥0:={s∈ℂ∣Re⁡(s)≥0}, and let 𝒲+ denote the ring of all functions f:ℂ≥0→ℂ such that f(s)=fa(s)+∑k=0∞fke−stk (s∈ℂ≥0), where fa∈L1(0,∞), (fk)k≥0∈ℓ1, and  0=t0<t1<t2<⋯ equipped with pointwise operations. (Here ⋅^ denotes the Laplace transform.) It is shown that the ring 𝒲+ is not coherent, answering a question of Alban Quadrat. In fact, we present two principal ideals in the domain 𝒲+ whose intersection is not finitely generated.