Milnor's triple linking number and Gauss diagram formulas of 3-bouquet graphs
Abstract
In this paper, we introduce two functions such that the subtraction corresponds to the Milnor's triple linking number; the addition obtains a new integer-valued link homotopy invariant of 3-component links. We also have found a series of integer-valued invariants derived from four terms whose sum equals the Milnor's triple linking number. We apply this structure to give invariants of 3-bouquet graphs.
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