Cardinal coefficients associated to certain orders on ideals

Abstract: We study cardinal invariants connected to certain classical orderings on the family of ideals on ω. We give topological and analytic characterizations of these invariants using the idealized version of Fréchet-Urysohn property and, in a special case, using sequential properties of the space of finitely-supported probability measures with the weak * topology. We investigate consistency of some inequalities between these invariants and classical ones, and other related combinatorial questions. At last, we discus… Show more

“…By J. Gerlits and Zs. Nagy [17] and P. Simon and B. Tsaban [44], we obtain that all the notions in Diagram 1 have the same uniformity number, namely the pseudointersection number p. Consequently, for the pseudointersection number p K (J ) introduced by P. Borodulin-Nadzieja and B. Farkas [5], we have the following result, see Corollary 10.1.…”

“…Let β < α. By part (1), we have Fin β M ≤ K Fin α M , and by part (5), it is enough to show that Fin α ≤ K Fin β . However, this follows by results by M. Katětov [26]: 9 He has shown in his Theorem 7.1 that considering all pointwise limits of all continuous functions on a topological space with respect to Fin ξ , one obtains exactly ξ-th Baire class of functions.…”

“…Thus we distinguish an [Ω, I-Γ]-space for many of the pairs of ideals among standard critical ideals considered in [6,7,19,20], see Corollaries 6.5, 8.4, and Diagram 3. Moreover, we study similar variation of Fréchet-Urysohn property of C p (X), denoted [Ω 0 , I-Γ 0 ]-space, and introduced by P. Borodulin-Nadzieja and B. Farkas [5]. We distinguish also these properties (Theorem 9.5).…”

“…According to [5,47], C p (X) possesses J -Fréchet-Urysohn property, shortly [Ω 0 , J -Γ 0 ], 20 if for every A ⊆ C p (X) and f ∈ A there is a sequence in A which J -converges to f , 21 which means that there exists a sequence a n : n ∈ ω of elements of A such that {n ∈ ω : a n ∈ O} ∈ J for any open neighbourhood O of f . We summarize the relations between properties [Ω 0 , J -Γ 0 ] for various standard critical ideals J in Diagram 4 which is similar to Diagram 3.…”

Ideal approach to convergence in functional spaces

“…By J. Gerlits and Zs. Nagy [17] and P. Simon and B. Tsaban [44], we obtain that all the notions in Diagram 1 have the same uniformity number, namely the pseudointersection number p. Consequently, for the pseudointersection number p K (J ) introduced by P. Borodulin-Nadzieja and B. Farkas [5], we have the following result, see Corollary 10.1.…”

“…Let β < α. By part (1), we have Fin β M ≤ K Fin α M , and by part (5), it is enough to show that Fin α ≤ K Fin β . However, this follows by results by M. Katětov [26]: 9 He has shown in his Theorem 7.1 that considering all pointwise limits of all continuous functions on a topological space with respect to Fin ξ , one obtains exactly ξ-th Baire class of functions.…”

“…Thus we distinguish an [Ω, I-Γ]-space for many of the pairs of ideals among standard critical ideals considered in [6,7,19,20], see Corollaries 6.5, 8.4, and Diagram 3. Moreover, we study similar variation of Fréchet-Urysohn property of C p (X), denoted [Ω 0 , I-Γ 0 ]-space, and introduced by P. Borodulin-Nadzieja and B. Farkas [5]. We distinguish also these properties (Theorem 9.5).…”

“…According to [5,47], C p (X) possesses J -Fréchet-Urysohn property, shortly [Ω 0 , J -Γ 0 ], 20 if for every A ⊆ C p (X) and f ∈ A there is a sequence in A which J -converges to f , 21 which means that there exists a sequence a n : n ∈ ω of elements of A such that {n ∈ ω : a n ∈ O} ∈ J for any open neighbourhood O of f . We summarize the relations between properties [Ω 0 , J -Γ 0 ] for various standard critical ideals J in Diagram 4 which is similar to Diagram 3.…”

Ideal approach to convergence in functional spaces

“…Let us recall that if J 1 is a dense ideal, then J 1 J 2 if and only if there is a 1 − 1 function f : [2] or [3]). Therefore, by the above fact we get that I|A I|B.…”

Homogeneous ideals on countable sets

Pseudointersection numbers, ideal slaloms, topological spaces, and cardinal inequalities