A Tauberian theorem for ideal statistical convergence

Abstract

Given an ideal I on the positive integers, a real sequence (xn) is said to be I-statistically convergent to provided that \n ∈ N: 1n|\k n: xk U\| \ ∈ I for all neighborhoods U of and all >0. First, we show that I-statistical convergence coincides with J-convergence, for some unique ideal J=J(I). In addition, J is Borel [analytic, coanalytic, respectively] whenever I is Borel [analytic, coanalytic, resp.]. Then we prove, among others, that if I is the summable ideal \A⊂eq N: Σa ∈ A1/a<∞\ or the density zero ideal \A⊂eq N: n ∞ 1n|A [1,n]|=0\ then I-statistical convergence coincides with statistical convergence. This can be seen as a Tauberian theorem which extends a classical theorem of Fridy. Lastly, we show that this is never the case if I is maximal.