On the faithful flatness of some modules arising in analysis

Abstract

The notion of faithful flatness of a module over a commutative ring is studied for two R-modules M arising in functional analysis, where R is a Banach algebra and M is a Hilbert space. The following results are shown: If X is a locally compact Hausdorff topological space, and μ is a positive Radon measure on X, then L2(X,μ) is a flat L∞(X,μ)-module. Moreover: (1) If μ is σ-finite, then for every finitely generated, nonzero, proper ideal n of L∞(X,μ), there holds nL2(X,μ)⊂neq L2(X,μ). (2) If X is the union of an increasing family of Borel sets Un, n∈ N, such that for each n∈ N, Un is compact and μ(Un+1 Un)>0, then L2(X,μ) is not a faithfully flat L∞(X,μ)-module. It is shown that the Hardy space H2 is a flat, but not a faithfully flat H∞-module (answering a 2005 question of Alban Quadrat).