Intersections of translates of finite-dimensionally valued frame spaces are conditionally slice-full and almost slice-full

Abstract

In recent work, the topology of frame spaces F(X,μ),n has been studied via Stiefel manifolds, revealing in particular a connectedness property for intersections of their translates when span(\aj\j ∈ J is not too large, in fact when codim(span\ajl\(j,l) ∈ J × [\![1,n]\!]) ≥ 3n, where \aj\j ∈ J is the translating family ElIdrissiKabbajMoalige2023. The investigation of the connectedness of the intersections of translates of the frame space can be extended to questions about the algebro-geometric and measure-theoretic structure of such intersections. The present article addresses these questions by uncovering an almost-linear structure within intersections of translated frame spaces. We show that the set of non-frames in finite-dimensional Hilbert C*-modules inherits the structure of a slice-wise real affine algebraic subvariety. As a consequence, it is a small subset in a precise measure-theoretic sense. In particular, we prove that for any finite-dimensional Hilbert C*-module H and any countable collection of translates of the frame space F(X,μ),H, the intersection is conditionally slice-full in L2(X,μ;H) and almost surely slice-full. We inform the reader that the notions of slice-wise real affine algebraic subvarieties (although related to ind-varieties), conditionally slice-full subsets and slice-full subsets (although related to shy sets) of a Hausdorff topological vector space are, to our knowledge, both new.