Wild high-dimensional Cantor fences in Rn, Part I
Abstract
Let C be the Cantor set. For each n≥slant 3 we construct an embedding A: C × C Rn such that A( C × \s\), for s∈ C, are pairwise ambiently incomparable everywhere wild Cantor sets (generalized Antoine's necklaces). This serves as a base for another new result proved in this paper: for each n≥slant 3 and any non-empty perfect compact set X which is embeddable in Rn-1, we describe an embedding A : X × C Rn such that each A (X × \s\ ), s∈ C, contains the corresponding A ( C × \s\ ), and is ``nice'' on the complement A (X × \s\ )-A ( C × \s\ ); in particular, the images A ( X × \s\), for s∈ C, are ambiently incomparable pairwise disjoint copies of X. This generalizes and strengthens theorems of J.R.Stallings (1960), R.B.Sher (1968), and B.L.Brechner-J.C.Mayer (1988).
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