Tile Numbers of Knot Corner Mosaics

Abstract

A knot mosaic is a grid of pictorial tiles representing a tame knot or link. Recently, two groups independently introduced a new set of tiles. We call mosaics made with these new tiles corner mosaics. The (corner) tile number is the minimum number of tiles needed to represent a knot or link as a (corner) mosaic. We show that the corner tile number lies strictly between the tile number and 3 times the tile number, resolving a question of Heap et al. We also show that the only knots and links with corner tile number <12 and no unlinked, unknotted components are the Hopf link P(1,1), the trefoil knot 31, Solomon's knot P(1,1,1,1), the connect sum of two Hopf links P(1,1) \# P(1,1), the cinquefoil knot 51, the star of David link P(1,1,1,1,1,1), the figure-eight knot 41, and the three-twist knot 52.

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