Abstract
AbstractIn this note, we deduce a strengthening of the Orlicz–Pettis theorem from the Itô–Nisio theorem. The argument shows that given any series in a Banach space which is not summable (or more generally unconditionally summable), we can construct a (coarse-grained) subseries with the property that—under some appropriate notion of “almost all”—almost all further subseries thereof fail to be weakly summable. Moreover, a strengthening of the Itô–Nisio theorem by Hoffmann–Jørgensen allows us to replace ‘weakly summable’ with ‘$$\tau$$
τ
-weakly summable’ for appropriate topologies $$\tau$$
τ
weaker than the weak topology. A treatment of the Itô–Nisio theorem for admissible $$\tau$$
τ
is given.
Funder
Massachusetts Institute of Technology
Publisher
Springer Science and Business Media LLC
Subject
Control and Optimization,Analysis,Algebra and Number Theory
Reference16 articles.
1. Alon, N., Spencer, J.H.: The Probabilistic Method. Wiley Series in Discrete Mathematics and Optimization, 4th edn. Wiley, New York (2016)
2. Bessaga, C., Pełczyński, A.: On bases and unconditional convergence of series in Banach spaces. Stud. Math. 17, 151–164 (1958). https://doi.org/10.4064/sm-17-2-151-164
3. Carothers, N.: A Short Course on Banach Space Theory. London Mathematical Society Student Texts, vol. 64. Cambridge University Press, Cambridge (2005)
4. Dierolf, P.: Theorems of the Orlicz–Pettis-type for locally convex spaces. Manuscr. Math. 20, 73–94 (1977)
5. Diestel, J.: The Orlicz–Pettis theorem. In: Sequences and Series in Banach Spaces. Graduate Texts in Mathematics 92, pp. 24–31. Springer (1984)