On the c0-equivalence and permutations of series

Abstract

Assume that a convergent series of real numbers Σn=1∞ an has the property that there exists a set A⊂eq such that the series Σn ∈ A an is conditionally convergent. We prove that for a given arbitrary sequence (bn) of real numbers there exists a permutation σ such that σ(n) = n for every n A and (bn) is c0-equivalent to a subsequence of the sequence of partial sums of the series Σn=1∞ aσ(n). Moreover, we discuss a connection between our main result with the classical Riemann series theorem.