An Alexander polynomial for MOY graphs
Abstract
We introduce an Alexander polynomial for MOY graphs. For a framed trivalent MOY graph G, we refine the construction and obtain a framed ambient isotopy invariant (G,c)(t). The invariant (G, c)(t) satisfies a series of relations, which we call MOY-type relations, and conversely these relations determine (G, c)(t). Using them we provide a graphical definition of the Alexander polynomial of a link. Finally, we discuss some properties and applications of our invariants.
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