On T-sequences and characterized subgroups

Abstract

Let X be a compact metrizable abelian group and u=\un\ be a sequence in its dual X. Set su (X)= \x: (un,x) 1\ and T0H = \(zn)∈ T∞ : zn 1 \. Let G be a subgroup of X. We prove that G=su (X) for some u iff it can be represented as some dually closed subgroup Gu of ClX G × T0H. In particular, su (X) is polishable. Let u=\un\ be a T-sequence. Denote by (X, u) the group X equipped with the finest group topology in which un 0. It is proved that (X, u) =Gu and n (X, u) = su (X). We also prove that the group generated by a Kronecker set can not be characterized.