The Alexander Polynomial of a Rational Link

Abstract

We relate some terms on the boundary of the Newton polygon of the Alexander polynomial (x,y) of a rational link to the number and length of monochromatic twist sites in a particular diagram that we call the standard form. Normalize (x,y) so that no x-1 or y-1 terms appear, but x-1(x,y) and y-1(x,y) have negative exponents, and so that terms of even total degree are positive and terms with odd total degree are negative. If the rational link has a reduced alternating diagram with no self crossings, then (-1, 0) = 1. If the standard form of the rational link has m monochromatic twist sites, and the jth monochromatic twist site has qj crossings, then (-1, 0) = Πj=1m(qj+1). Our proof employs Kauffman's clock moves and a lattice for the terms of (x,y) in which the y-power cannot decrease.