168-Haar Graph
2Q_3
vertex count | 16 edge count | 24 connected component count | 2
apex | arc-transitive | bicolorable | bicubic | bipartite | bridgeless | Cayley graphs | class 1 | cubic | cyclic | disconnected | distance-regular | distance-transitive | edge-transitive | flexible | Haar | I graphs | integral | linklessly embeddable | local | map | Meyniel | multigraphic | nonempty | noneulerian | nongeometric | nonhamiltonian | not determined by resistance | not determined by spectrum | perfect | perfect matching | planar | projective planar | regular | simple | switchable | symmetric | Taylor | triangle-free | uniquely embeddable | unit-distance | untraceable | vertex-transitive | weakly perfect | weakly regular
(not a named graph)
(not a named graph)
vertex degrees | 3 (16 vertices)
radius | ∞ diameter | ∞ girth | 4 vertex connectivity | 0 edge connectivity | 0
(x - 3)^2 (x - 1)^6 (x + 1)^6 (x + 3)^2
(x^7 y^5 + 12 x^7 y^4 + 66 x^7 y^3 + 212 x^7 y^2 + 408 x^7 y + 384 x^7 + ... + 489 x^4 + 6 x^3 y + 220 x^3 + 66 x^2 + 12 x + 1 (20 terms))^2
(x^7 + 5 x^6 + 15 x^5 + 6 x^4 y + 29 x^4 + 24 x^3 y + 40 x^3 + 12 x^2 y^2 + ... + 46 x y + 11 x + y^5 + 7 y^4 + 20 y^3 + 25 y^2 + 11 y (19 terms))^2
chromatic number | 2 edge chromatic number | 3
(-3)^2 (-1)^6 1^6 3^2
Hosoya index | 11664 Kirchhoff index | ∞ stability index | 6400 Wiener index | ∞