On the set of limit points of conditionally convergent series

Abstract

Let Σn=1∞ xn be a conditionally convergent series in a Banach space and let τ be a permutation of natural numbers. We study the set LIM(Σn=1∞ xτ(n)) of all limit points of a sequence (Σn=1p xτ(n))p=1∞ of partial sums of a rearranged series Σn=1∞ xτ(n). We give full characterization of limit sets in finite dimensional spaces. Namely, a limit set in Rm is either compact and connected or it is closed and all its connected components are unbounded. On the other hand each set of one of these types is a limit set of some rearranged conditionally convergent series. Moreover, this characterization does not hold in infinite dimensional spaces. We show that if Σn=1∞ xn has the Rearrangement Property and A is a closed subset of the closure of the Σn=1∞ xn sum range and it is -chainable for every >0, then there is a permutation τ such that A=LIM(Σn=1∞ xτ(n)). As a byproduct of this observation we obtain that series having the Rearrangement Property have closed sum ranges.