[Graph Theory - Discrete Mathematics] How do you solve this? Let G=(V,E) be a co

CMIIh

CMIIh

Answered question

2021-08-16

[Graph Theory - Discrete Mathematics] How do you solve this?
Let G=(V,E) be a connected simple graph, and call the edge (u,v)E essential if the graph obtained by removing (u, v) from G is disconnected. Show that G is a tree if and only if all its edges are essential.

Answer & Explanation

Sally Cresswell

Sally Cresswell

Skilled2021-08-17Added 91 answers

Step 1 
Given 
Let G=(V,E) be a connected simple graph, and call the edge (u,v)E essential if the graph obtained by removing (u,v) from G is disconnected. 
Step 2 
Solution 
In order to demonstrate that G is a tree, all of its edges must be connected.
As each vertex in a tree has a distinct path connecting it to it, they are all connected.
So removing an edge from the graph will make it disconnected or just as two distinct subgraphs. 
Therefore, it is simple to infer that G is a tree if and only if all of its edges are necessary.

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