On the inverse best approximation property of systems of subspaces of a Hilbert space

Abstract

Let H be a Hilbert space and H1,...,Hn be closed subspaces of H. Denote by Pk the orthogonal projection onto Hk, k=1,2,...,n. Following Patrick L. Combettes and Noli N. Reyes, we will say that the system of subspaces H1,...,Hn possesses the inverse best approximation property (IBAP) if for arbitrary elements x1∈ H1,...,xn∈ Hn there exists an element x∈ H such that Pk x=xk for all k=1,2,...,n. We provide various new necessary and sufficient conditions for a system of n subspaces to possess the IBAP. Using the main characterization theorem, we study properties of the systems of subspaces which possess the IBAP, obtain a sufficient condition for a system of subspaces to possess the IBAP, and provide examples of systems of subspaces which possess the IBAP. These results are applied to a problem of probability theory. Let (,F,μ) be a probability space and F1,...,Fn be sub-σ-algebras of F. We will say that the collection F1,...,Fn possesses the inverse marginal property (IMP) if for arbitrary random variables 1,...,n such that (1) k is Fk-measurable, k=1,2,...,n; (2) E|k|2<∞, k=1,2,...,n; (3) E1=E2=...=En, there exists a random variable such that E||2<∞ and E(|Fk)=k for all k=1,2,...,n. We will show that a collection of sub-σ-algebras possesses the IMP if and only if the system of corresponding marginal subspaces possesses the IBAP. We consider two examples; in the first example =N, in the second example =[a,b). For these examples we establish relations between the IMP, the IBAP, closedness of the sum of marginal subspaces and "fast decreasing" of tails of the measure μ.