A simple inductive proof of Levy-Steinitz theorem

Abstract

We present a relatively simple inductive proof of the classical Levy-Steinitz Theorem saying that for a sequence (xn)n=1∞ in a finite-dimensional Banach space X the set of all sums of rearranged series Σn=1∞ xσ(n) is an affine subspace of X. This affine subspace is not empty if and only if for any linear functional f:X R the series Σn=1∞ f(xσ(n)) is convergent for some permutation σ of N. This gives an answer to a problem of Vaja Tarieladze, posed in Lviv Scottish Book in September, 2017. Also we construct a sequence (xn)n=1∞ in the torus T× T such that the series Σn=1∞ xσ(n) is divergent for all permutations σ of N but for any continuous homomorphism f: T2 T to the circle group T:= R/ Z the series Σn=1∞ f(xσf(n)) is convergent for some permutation σf of N. This example shows that the second part of Levy-Steinitz Theorem (characterizing sequences with non-empty set of potential sums) does not extend to locally compact Abelian groups.