| dc.description.abstract | Let G = (V (G); E(G)) be a nontrivial connected graph with an edge coloring
c : E(G) ! f1; 2; :::; lg; l 2 N, with the condition that the adjacent edges may be colored by
the same colors. A path P in G is called rainbow path if no two edges of P are colored the
same. The smallest number of colors that are needed to make G rainbow edge-connected is
called the rainbow edge-connection of G, denoted by rc(G). A vertex-colored graph is rainbow
vertex-connected if any two vertices are connected by a path whose internal vertices have distinct
colors. The smallest number of colors that are needed to make G rainbow vertex-connected
is called the rainbow vertex-connection of G, denoted by rvc(G). A total-colored path is totalrainbow
if edges and internal vertices have distinct colours. The minimum number of colour
required to color the edges and vertices of G is called the total rainbow connection number of G,
denoted by trc(G). In this paper, we determine the total rainbow connection number of some
wheel related graphs such as gear graph, antiweb-gear graph, in nite class of convex polytopes,
sun
ower graph, and closed-sun
ower graph. | en_US |
