Cantor sets with high-dimensional projections

Abstract

In 1994, J.Cobb constructed a tame Cantor set in R3 each of whose projections into 2-planes is one-dimensional. We show that an Antoine's necklace can serve as an example of a Cantor set all of whose projections are one-dimensional and connected. We prove that each Cantor set in Rn, n≥slant 3, can be moved by a small ambient isotopy so that the projection of the resulting Cantor set into each (n-1)-plane is (n-2)-dimensional. We show that if X⊂ Rn, n≥slant 2, is a zero-dimensional compactum whose projection into some plane ⊂ Rn with ∈ \1, 2, n-2, n-1\ is zero-dimensional, then X is tame; this extends some particular cases of the results of D.R.McMillan, Jr. (1964) and D.G.Wright, J.J.Walsh (1982). We use the technique of defining sequences which comes back to Louis Antoine.

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