Productivity of sequences with respect to a given weight function

Abstract

Given a function f: N --> (omega+1)-0, we say that a faithfully indexed sequence an: n in N of elements of a topological group G is: (i) f-Cauchy productive (f-productive) provided that the sequence prodn=0m anz(n): m in N is left Cauchy (converges to some element of G, respectively) for each function z: N --> Z such that |z(n)| <= f(n) for every n in N; (ii) unconditionally f-Cauchy productive (unconditionally f-productive) provided that the sequence as(n): n in N\ is (f s)-Cauchy productive (respectively, (f s)-productive) for every bijection s: N --> N. (Bijections can be replaced by injections here.) We consider the question of existence of (unconditionally) f-productive sequences for a given "weight function" f. We prove that: (1) a Hausdorff group having an f-productive sequence for some f contains a homeomorphic copy of the Cantor set; (2) if a non-discrete group is either locally compact Hausdorff or Weil complete metric, then it contains an unconditionally f-productive sequence for every function f: N--> N; (3) a metric group is NSS if and only if it does not contain an fomega-Cauchy productive sequence, where fomega is the function taking the constant value omega. We give an example of an fomega-productive sequence an: n in N in a (necessarily non-abelian) separable metric group H with a linear topology and a bijection s: N --> N such that the sequence prodn=0m as(n): m in N diverges, thereby answering a question of Dominguez and Tarieladze. Furthermore, we show that H has no unconditionally fomega-productive sequences. As an application of our results, we resolve negatively a question from Cp(-,G)-theory.