On σ-convex subsets in spaces of scatteredly continuous functions

Abstract

We prove that for any topological space X of countable tightness, each σ-convex subspace of the space SCp(X) of scatteredly continuous real-valued functions on X has network weight nw() nw(X). This implies that for a metrizable separable space X, each compact convex subset in the function space SCp(X) is metrizable. Another corollary says that two Tychonoff spaces X,Y with countable tightness and topologically isomorphic linear topological spaces SCp(X) and SCp(Y) have the same network weight nw(X)=nw(Y). Also we prove that each zero-dimensional separable Rosenthal compact space is homeomorphic to a compact subset of the function space SCp(ωω) over the space ωω of irrationals.