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Paper detail

The motif problem

Fix a choice and ordering of four pairwise non-adjacent vertices of a parallelepiped, and call a motif a sequence of four points in R^3 that coincide with these vertices for some, possibly degenerate, parallelepiped whose edges are parallel to the axes. We show that a set of r points can contain at most r^2 motifs. Generalizing the notion of motif to a sequence of L points in R^p, we show that the maximum number of motifs that can occur in a point set of a given size is related to a linear programming problem arising from hypergraph theory, and discuss some related questions.

preprint2012arXivOpen access
E. Rodney CanfieldRon FertigR. Daniel MauldinDavid Moews
math.CO
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E. Rodney CanfieldRon FertigR. Daniel MauldinDavid Moews

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