# How can I represent an Eulerian cycle on a graph?

I need to animate an Eulerian path. I have the code for a random walk on any given graph but I can't work out a program that represents the specefic walk I want.

This is my code for a random walk

``````Cammino[g_] =
Block[{graph = g, start, path},
start = RandomChoice[VertexList[graph]];
path = NestList[RandomChoice[AdjacencyList[graph, #]] &, start,
RandomInteger[{2, 30}]];
ListAnimate[
Table[Graph[graph,
VertexStyle ->
Append[Map[Rule[#, Pink] &, Union[path[[1 ;; v]]]],
path[[v]] -> Red],
EdgeStyle ->
Evaluate[(UndirectedEdge[#1, #2] -> Directive[Red, Thick]) & @@@
Partition[path[[1 ;; v]], 2, 1]], VertexSize -> Large], {v,
Length[path]}]]]
``````

And this is my attempt on the eulerian cycle

``````Euleriano[g_] =
Block[{grafo = g, inizio, cammino},
inizio = FindEulerianCycle[grafo][][][];
cammino =
NestList[RandomChoice[AdjacencyList[grafo, #]] &, inizio,
RandomInteger[{2, 30}]];
ListAnimate[
Table[Graph[grafo,
VertexStyle ->
Append[Map[Rule[#, Pink] &, Union[cammino[[1 ;; v]]]],
cammino[[v]] -> Red],
EdgeStyle ->
Evaluate[(UndirectedEdge[#1, #2] -> Directive[Red, Thick]) & @@@
Partition[cammino[[1 ;; v]], 2, 1]],
VertexSize -> Large], {v, Length[cammino]}]]]
``````

For clarification, cammino=walk, inizio=start, grafo=graph. I think I have to change the definition of 'cammino' in the second piece of code so that the walk follows the one obtained using the Mathematica function FindEulerianCycle[]. My question is how can I do this.