A strengthened Orlicz–Pettis theorem via Itô–Nisio

Author(s)

Sussman, Ethan

Abstract

Abstract In 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.

Date issued

2023-01-03

URI

https://hdl.handle.net/1721.1/147006

Department

Massachusetts Institute of Technology. Department of Mathematics

Publisher

Springer International Publishing

Citation

Annals of Functional Analysis. 2023 Jan 03;14(1):22

Version: Final published version