Aug 26, 1999 · Title:Chromatic Polynomials and their Zeros and Asymptotic Limits for Families of Graphs. Authors:Robert Shrock. Download a PDF of the paper ...

We give a comparative discussion of exact calculations of P and W for a variety of recursive families of graphs, including strips of regular lattices with ...

We give a comparative discussion of exact calculations of P and. W for a variety of recursive families of graphs, including strips of regular lattices with ...

We give a comparative discussion of exact calculations of $P$ and $W$ for a variety of recursive families of graphs, including strips of regular lattices with ...

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Chromatic polynomials and their zeros and asymptotic limits for families of graphs. Author: Robert Shrock. Robert Shrock. View Profile. Authors Info & Claims.

We calculate the chromatic polynomials $P((G_s)_m,q)$ and, from these, the asymptotic limiting functions $W(\{G_s\},q)=\lim_{n \to \infty}P(G_s,q)^{1/n}$ ...

Dec 13, 1997 · Abstract: We calculate the chromatic polynomials P((G_s)_m,q) and, from these, the asymptotic limiting functions W(\{G_s\},q)=\lim_{n \to ...

We study the asymptotic limiting function W($G%,q)5limn→` P(G,q)1/n, where P(G,q) is the chromatic polynomial for a graph G with n vertices.

We calculate the chromatic polynomials P((Gs)m,q) and, from these, the asymptotic limiting functions W({Gs},q)=limn→∞P(Gs,q)1/n for families of n-vertex ...