Mosaic number and Tile number of Corner Connection Tiles
Abstract
Lomonaco and Kauffman introduced knot mosaics in 2008 to model physical quantum states. These mosaics use a set of tiles to represent knots on n x n grids. In 2023 Heap introduced a new set of tiles that can represent knots on a smaller board for small knots. Completing an exhaustive search of all knots or links, K, on different board sizes and types is the most common way to determine invariants for knots, such as the smallest board size needed to represent a knot, m(K), and the least number of tiles needed to represent a knot, t(K). In this paper, we propose a solution to an open question by providing a proof that all knots or links can be represented on corner connection mosaics using fewer tiles than traditional mosaics tc(K) < t(K), where tc(K) is the smallest number of corner connection tiles needed to represent knot K. We also define bounds for corner connection mosaic size, mc(K), in terms of crossing number, c(K), and simultaneously create a tool called the Corner Mosaic Complement that we use to discover a relationship between traditional tiles and corner connection tiles. Finally, we construct an infinite family of links Ln where the corner connection mosaic number mc(K) is known and provide a tool to analyze the efficiency of corner connection mosaic tiles.
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