Singular Hecke algebras, Markov traces, and HOMFLY-type invariants

Abstract

We define the singular Hecke algebra H (SBn) as the quotient of the singular braid monoid algebra C (q) [SBn] by the Hecke relations σk2 = (q-1) σk +q, 1 k n-1, and define the Markov traces on the sequence \ H(SBn)\n=1+∞ in the same way as for the Markov traces on the tower of (non-singular) Hecke algebras of the symmetric groups. We prove that the Markov traces are in one-to-one correspondance with the invariants that satisfies some skein relation, and compute an explicit classification of the Markov traces. Thanks to this classification, we define some universal HOMFLY-type invariant which has the property that it distinguishes all the pairs of singular links that can be distinguished by an invariant which satisfies the required skein relation.