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A convex set with a rich difference

We construct a convex set $A$ with cardinality $2n$ and with the property that an element of the difference set $A-A$ can be represented in $n$ different ways. We also show that this construction is optimal by proving that for any convex set $A$, the maximum possible number of representations an element of $A-A$ can have is $\lfloor |A|/2 \rfloor $.

preprint2022arXivOpen access

Oliver Roche-Newton Audie Warren

math.CO

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Oliver Roche-Newton Audie Warren

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