A study on T-equivalent graphs

Abstract

In his article [J. Comb. Theory Ser. B 16 (1974), 168-174], Tutte called two graphs T-equivalent (i.e., codichromatic) if they have the same Tutte polynomial and showed that graphs G and G' are T-equivalent if G' is obtained from G by flipping a rotor (i.e., replacing it by its mirror) of order at most 5, where a rotor of order k in G is an induced subgraph R having an automorphism with a vertex orbit \i(u): i 0\ of size k such that every vertex of R is only adjacent to vertices in R unless it is in this vertex orbit. In this article, we first show the above result due to Tutte can be extended to a rotor R of order k 6 if the subgraph of G induced by all those edges of G which are not in R satisfies certain conditions. Also, we provide a new method for generating infinitely many non-isomorphic T-equivalent pairs of graphs.