We show that products of sufficiently thick Cantor sets generate trees in the
plane with constant distance between adjacent vertices. Moreover, we prove that
the set of admissible gap lengths has non-empty interior. This builds on the
authors' previous work on distance sets of products of Cantor sets of
sufficient Newhouse thickness

McDonald, Alex

Taylor, Krystal

English

arXiv

We show that products of sufficiently thick Cantor sets generate trees in the
plane with constant distance between adjacent vertices. Moreover, we prove that
the set of choices for this distance has non-empty interior. We allow our trees
to be countably infinite, which further distinguishes this work from previous
results on patterns in fractal sets. This builds on the authors' previous work
on graphs and distance sets of products of Cantor sets of sufficient Newhouse
thickness

Constant gap length trees in products of thick Cantor sets

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