On projections of a compact set in RN

Abstract

We apply ideas of geometric measure theory and Baire category theory to topological problems, namely, to topological embeddings of compact sets into Euclidean spaces. In 1947, Borsuk constructed a Cantor set in RN, N≥slant 3, such that its projection onto any (N-1)-plane contains an (N-1)-dimensional ball. This can be strengthened: a desired Cantor set can be obtained from an arbitrary Cantor set by an arbitrarily small isotopy of the space RN. The question arises: how do the dimensions of the projections of a compact set X⊂ RN behave under a typical ambient isotopy or under a typical ambient homeomorphism? (Typical in the sense of the Baire category.) We solve this problem. As a consequence, we get new criteria of tameness and wildness of a Cantor set in terms of its projections. Our main result strengthens Väisälä's theorem (1979) connecting Hausdorff dimension and Shtan'ko embedding dimension. In its turn, Väisälä's theorem extends results of Nöbeling (1931) and Szpilrajn (1937) on relationship between Hausdorff dimension and topological dimension.