Petal grid diagrams of torus knots
Abstract
A petal diagram of a knot is a projection with a single multi-crossing such that there are no nested loops. The petal number p(K) of a knot K is the minimum number of loops among all petal diagrams of K. Let Tn,s denote the (n,s)-torus knot for relatively prime integers 2 n<s. Recently, Kim, No and Yoo proved that p(Tn,s) 2s-2 sn+1 whenever s 1 n. They conjectured that the inequality holds without the assumption s 1 n. They also showed that p(Tn,s)=2s-1 whenever 2 n<s<2n and n 1 s-n. Their proofs construct petal grid diagrams for those torus knots. In this paper, we prove the conjecture that p(Tn,s) 2s-2 sn+1 holds for any 2 n<s. We also show that p(Tn,s)=2s-1 holds for any 2 n<s<2n. Our proofs construct petal grid diagrams for any torus knots.
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