Sets of Ramsey-limit points and IP-limit points

Abstract

Let X be an uncountable Polish space and let H be the Hindman ideal, that is, the family of all S⊂eq ω which are not IP-sets. For each sequence x=(xn)n ∈ ω taking values in X, let x(FS) be the set of IP-limit points of x. Also, let x(H) be the set of H-limit points of x, that is, the set of ordinary limits of subsequences (xn)n ∈ S with S H. After proving that these two notions do not coincide in general, we show that both families of nonempty sets of the type x(FS) and of the type x(H) are precisely the class of nonempty analytic subsets of X. An analogous result holds also for Ramsey convergence. In the proofs, we use the concept of partition regular functions introduced in J. Symb. Log. (2024) [doi:10.1017/jsl.2024.8], which provide a unified approach to these types of convergence.