A new basis for the Homflypt skein module of the solid torus

Abstract

In this paper we give a new basis, , for the Homflypt skein module of the solid torus, S( ST), which was predicted by Jozef Przytycki, using topological interpretation. The basis is different from the basis , discovered independently by Hoste--Kidwell HK and Turaev Tu with the use of diagrammatic methods. For finding the basis we use the generalized Hecke algebra of type B, H1,n, defined by the second author in La2, which is generated by looping elements and braiding elements and which is isomorphic to the affine Hecke algebra of type A. Namely, we start with the well-known basis of S( ST), , and an appropriate linear basis n of the algebra H1,n. We then convert elements in to linear combinations of elements in the new basic set . This is done in two steps: First we convert elements in to elements in n. Then, using conjugation and the stabilization moves, we convert these elements to linear combinations of elements in by managing gaps in the indices of the looping elements and by eliminating braiding tails in the words. Further, we define an ordering relation in and and prove that the sets are totally ordered. Finally, using this ordering, we relate the sets and via a block diagonal matrix, where each block is an infinite lower triangular matrix with invertible elements in the diagonal and we prove linear independence of the set . The infinite matrix is then "invertible" and thus, the set is a basis for S( ST). The aim of this paper is to provide the basic algebraic tools for computing skein modules of c.c.o. 3-manifolds via algebraic means.