Chromatic Polynomial Evaluation Spectra
Abstract
Around 10 years ago, Agol and Krushkal showed that the number of chromatic polynomials PG arising from graphs G on n vertices grows exponentially with n, by establishing that the (dual) flow polynomial FG(3+52) already takes on exponentially many values, if one varies G over all planar cubic graphs G on n vertices. We show, more generally, that the size of the set \PG(q): |V(G)|=n\ is exponential in n, for every fixed real number q ≠ 0,1,2. In fact, our approach can also be pushed to show that PG(q) already takes on exponentially many values, if we only vary G over all planar graphs on n vertices. The case q=3 confirms a conjecture of Agol, which was initially motivated by the NP-completeness of planar 3-colorability.
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