Maps with dimensionally restricted fibers
Abstract
We prove that if f X Y is a closed surjective map between metric spaces such that every fiber f-1(y) belongs to a class of space S, then there exists an Fσ-set A⊂ X such that A∈ S and f-1(y) A=0 for all y∈ Y. Here, S can be one of the following classes: (i) \M:e-dimM≤ K\ for some CW-complex K; (ii) C-spaces; (iii) weakly infinite-dimensional spaces. We also establish that if S=\M: M≤ n\, then f g≤ 0 for almost all g∈ C(X, In+1).
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