On ∞-convex sets in spaces of scatteredly continuous functions
Abstract
Given a topological space X, we study the structure of ∞-convex subsets in the space SCp(X) of scatteredly continuous functions on X. Our main result says that for a topological space X with countable strong fan tightness, each potentially bounded ∞-convex subset F⊂ SCp(X) is weakly discontinuous in the sense that each non-empty subset A⊂ X contains an open dense subset U⊂ A such that each function f|U, f∈ F, is continuous. This implies that F has network weight nw(F) nw(X).
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