Kauffman-Jones polynomial of a curve on a surface

Abstract

We introduce a Kauffman-Jones type polynomial Lγ(A) for a curve γ on an oriented surface, whose endpoints are on the boundary of the surface. The polynomial Lγ(A) is a Laurent polynomial in one variable A and is an invariant of the homotopy class of γ. As an application, we obtain an estimate in terms of the span of Lγ(A) for the minimum self-intersection number of a curve within its homotopy class. We then give a chord diagrammatic description of Lγ(A) and show some computational results on the span of Lγ(A).