A New Bound on Odd Multicrossing Numbers of Knots and Links

Abstract

An n-crossing projection of a link L is a projection of L onto a plane such that n points on L are superimposed on top of each other at every crossing. We prove that for all k ∈ N and all links L, the inequality c2k+1(L) ≥ 2g(L) + r(L)-1k2 holds, where c2k+1(L), g(L), and r(L) are the (2k+1)-crossing number, 3-genus, and number of components of L respectively. This result is used to prove a new bound on the odd crossing numbers of torus knots and generalizes a result of Jablonowski. We also prove a new upper bound on the 5-crossing numbers of the 2-torus knots and links. Furthermore, we improve the lower bounds on the 5-crossing numbers of 79 knots with 2-crossing number ≤ 12. Finally, we improve the lower bounds on the 7-crossing numbers of 5 knots with 2-crossing number ≤ 12.