0,4

Tutte's graph is a non-Hamiltonian 3-connected cubic graph and has 46 vertices and 69 edges.

Weisstein, Eric W. "Tutte's Graph".

Weisstein, Eric W. "Chromatic Polynomial".

Timme, Marc; van Bussel, Frank; Fliegner, Denny; Stolzenberg, Sebastian (2009) "Counting complex disordered states by efficient pattern matching: chromatic polynomials and Potts partition functions", New J. Phys. 11 023001, doi: 10.1088/1367-2630/11/2/023001.

a(n) = n^46 -69*n^45 + ... (see Maple program).

a:= n-> n^46 -69*n^45 +2346*n^44 -52388*n^43 +864090*n^42 -11224668*n^41 +119571727*n^40 -1073918754*n^39 +8297710913*n^38 -56003778409*n^37 +334132896213*n^36 -1779060044140*n^35 +8518879333839*n^34 -36919189414713*n^33 +145576288126673*n^32 -524582778909860*n^31 +1733926880890968*n^30 -5273413882507148*n^29 +14795464456226603*n^28 -38377923819676665*n^27 +92198081030378865*n^26 -205432211375233863*n^25 +425010309538429644*n^24 -817071784257131829*n^23 +1460390102714891125*n^22 -2427269661879319776*n^21

+3751228994738590035*n^20 -5388532329671500274*n^19 +7189601527638524235*n^18 -8900642446016426022*n^17 +10209296517904329101*n^16 -10829536267918267572*n^15 +10597816407206520989*n^14 -9538751939522734322*n^13 +7866252277444668060*n^12 -5914803096515435788*n^11 +4030254107398817420*n^10 -2468895384899966394*n^9 +1345725960500827472*n^8 -643733683706244378*n^7 +265193759121824448*n^6 -91607610668166096*n^5 +25500157237142048*n^4 -5365394930683662*n^3 +758432173511393*n^2 -53976523441418*n: seq (a(n), n=0..15);

Sequence in context: A050259 A015384 A072018 this_sequence A017409 A017529 A133688

Adjacent sequences: A158723 A158724 A158725 this_sequence A158727 A158728 A158729

nonn

Alois P. Heinz (heinz(AT)hs-heilbronn.de), Mar 24 2009