A state sum invariant for regular isotopy of links having a polynomial number of states

Abstract

The state sum regular isotopy invariant of links which I introduce in this work is a generalization of the Jones Polynomial. So it distinguishes any pair of links which are distinguishable by Jones'. This new invariant, denoted VSE-invariant is strictly stronger than Jones': I detected a pair of links which are not distinguished by Jones' but are distinguished by the new invariant. The full VSE-invariant has 3n states. However, there are useful specializations of it parametrized by an integer k, having O(nk)=Σ=0k n 2 states. The link with more crossings of the pair which was distinguished by the VSE-invariant has 20 crossings. The specialization which is enough to distinguish corresponds to k=2 and has only 801 states, as opposed to the 220 = 1,048,576 states of the Jones polynomial of the same link. The full VSE-invariant of it has 320 = 3,486,784,401 states. The VSE-invariant is a good alternative for the Jones polynomial when the number of crossings makes the computation of this polynomial impossible. For instance, for k=2 the specialization of the VSE-invariant of a link with n=500 crossings can be computed in a few minutes, since it has only 2 n2+1 = 500,001 states.