All Questions
Tagged with eulerian-path planar-graphs
12
questions
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Networks: Covering each edge and starting and ending at the same vertice when repeating edges must be involved.
I'm in year 11 and my question is regarding a certain topic that I've come across in my curriculum. The problem surrounding this question is about creating a path of minimum length that covers each ...
0
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e <= 3v - 6 for planar graph question: why does every face (of a planar graph) have to have at least three sides?
Can't we make a face with just two edges(sides) and two vertices? We just connect those two vertices twice each with different edges and we can make a face between the two edges with only two vertices ...
3
votes
2
answers
182
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Is this degree sequence planar?
For the degree sequence [6,6,4,4,4,4,2,2,2,2]. Then this graph has $f = 10$ by euler's formula. Let $T$ be the number of triangles. Then the inequalities $2e = 36 \geq 3T + 4(10 - T)$ shows that $T \...
0
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1
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Graph problem about roads built between towns [closed]
There are 10 cities in a country. The Government starts to build direct roads between the cities, but with random access, it can build direct road between two cities even if there is already another ...
0
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1
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79
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Maximal graph not containing a subdivision of $K_5$ is $2$-connected?
I am trying to prove that a graph not containing no subdivisions of $K_5$, such that the addition of any edge would result in the existence of such a subdivision, is $2$-connected.
I already know the ...
5
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2
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1k
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How can one justify if the graph is planar from adjacency matrix?
Given an adjacency matrix of a graph $G$, I was asked to do the following without drawing the graph:
A) Find the vertex of largest degree.
B) Does the graph have an Euler Circuit?
C) Is the graph ...
2
votes
2
answers
63
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Graph with conditions
G is a graph whose vertex set is $\{1,2, ... , 82\}$, vertices $i$ and $j$ are adjacent iff $|i-j| \mod 4 = 0 \text{ and } i \neq j$.
(a) Calculate the chromatic number of $G$.
(b) Is $G$ Eulerian?
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3
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2
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Is there a simple planar graph with n vertices which has the most possible edges that is also Eulerian
For each $n$, where $n>=3$, are there any graphs in the set of all graphs with $n$ vertices that are simple and planar, and have the most possible number of edges, that also have an Eulerian path ...
1
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2
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Is there a $6$ vertex planar graph which which has Eulerian path of length $9$?
Let $G$ be a simple graph with Eulerian path of length $9$. There're two non-adjacent vertices $u, v$ in $G$ and if we connect $u$ and $v$ by an edge $G$ is not planar anymore. Does such a graph exist ...
1
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1
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Planar graph has an euler cycle iff its faces can be colored with 2 colors
Planar graph has an euler cycle iff its faces can be properly colored with 2 colors (such way the colors of two faces that has the common edge are different).
I have an idea to consider the dual ...
5
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2
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6k
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Prove that the graph dual to Eulerian planar graph is bipartite.
How would I go about doing this proof I am not very knowledgeable about graph theory I know the definitions of planar and bipartite and dual but how do you make these connection
8
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3
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Prove that Petersen's graph is non-planar using Euler's formula
Prove that Petersen's graph is non-planar using Euler's formula.
I know that $n - m + f = 2$. But should I count $f$ and prove that the summation does not equal to two or solve to get $f =7$ and ...