Structure of sets of bounded sequences with a prescribed number of accumulation points

Abstract

For each vector x∈ ∞, we can define the non-empty compact set Lx of accumulation points of x. Given an infinite subset A of N\1\, we can therefore investigate under which conditions on A, the set L(A):=\x∈ ∞: |Lx|∈ A\ is lineable or even densely lineable. In particular, we show that if L(A) is lineable then there exists k 1 such that A (A-k) is infinite and that if L(A) is densely lineable then A (A-1) is infinite. We end up by answering an open question on the existence of a closed non-separable subspace in which each non-zero vector has countably many accumulation points.