On finite-to-one maps
Abstract
Let f X Y be a σ-perfect k-dimensional surjective map of metrizable spaces such that Y≤ m. It is shown that, for every positive integer p≥ 1 there exists a dense Gδ-subset H(k,m,p) of C(X,k+p) with the source limitation topology such that if g∈ H(k,m,p), then each fiber of f g contains at most \m+k-p+2,1\ points.This result provides a proof of two hypotheses of S. Bogatyi, V. Fedorchuk and J. van Mill.
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