We prove existence of finite Helly numbers for crystals and for
cut-and-project sets with convex windows; also we prove exact bound of $k+6$
for the Helly number of a crystal consisting of $k$ copies of a single lattice.
We show that there are sets of finite local complexity that do not have finite
Helly numbers

Garber, Alexey

English

arXiv

We prove existence of Helly numbers for crystals and for cut-and-project sets
with convex windows. Also we show that for a two-dimensional crystal consisting
of $k$ copies of a single lattice the Helly number does not exceed $k+6$

On Helly number for crystals and cut-and-project sets

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