On the set of wild points of attracting surfaces in R3
Abstract
Suppose that a closed surface S ⊂eq R3 is an attractor, not necessarily global, for a discrete dynamical system. Assuming that its set of wild points W is totally disconnected, we prove that (up to an ambient homeomorphism) it has to be contained in a straight line. Using this result and a modification of the classical construction of a wild sphere due to Antoine we show that there exist uncountably many different 2--spheres in R3 none of which can be realized as an attractor for a homeomorphism.
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