Limit points of subsequences

Abstract

Let x be a sequence taking values in a separable metric space and I be a generalized density ideal or an Fσ-ideal on the positive integers (in particular, I can be any Erd os--Ulam ideal or any summable ideal). It is shown that the collection of subsequences of x which preserve the set of I-cluster points of x [respectively, I-limit points] is of second category if and only if the set of I-cluster points of x [resp., I-limit points] coincides with the set of ordinary limit points of x; moreover, in this case, it is comeager. In particular, it follows that the collection of subsequences of x which preserve the set of ordinary limit points of x is comeager.