Knotting Minimal Sets
Abstract
We consider the ways minimal sets of flows in S3 may be embedded. We prove that given any C2 flow on S3 with positive entropy, there is an uncountable collection M of topologically distinct minimal sets such that for each M∈ M there are infinitely many embedded copies of M in the flow, each copy with a distinct knot type, thus extending work of Franks and Williams for periodic orbits.
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