Coloring link diagrams by Alexander quandles
Abstract
In this paper, we study the colorability of link diagrams by the Alexander quandles. We show that if the reduced Alexander polynomial L(t) is vanishing, then L admits a non-trivial coloring by any non-trivial Alexander quandle Q, and that if L(t)=1, then L admits only the trivial coloring by any Alexander quandle Q, also show that if L(t)=0, 1, then L admits a non-trivial coloring by the Alexander quandle /(L(t)).
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