Upper bound on the total number of knot n-mosaics

Abstract

Lomonaco and Kauffman introduced a knot mosaic system to give a definition of a quantum knot system which can be viewed as a blueprint for the construction of an actual physical quantum system. A knot n-mosaic is an n × n matrix of 11 kinds of specific mosaic tiles representing a knot or a link by adjoining properly that is called suitably connected. Dn denotes the total number of all knot n-mosaics. Already known is that D1=1, D2=2, and D3=22. In this paper we establish the lower and upper bounds on Dn 2275(9 · 6n-2 + 1)2 · 2(n-3)2 \ ≤ \ Dn \ ≤ \ 2275(9 · 6n-2 + 1)2 · (4.4)(n-3)2. and find the exact number of D4 = 2594.