Discrete Math Graph Theory Independent sets. An independent set is a set of vertices in a graph, no two of which are adjacent. Let G be a graph with n vertices and with the maximal degree equal to triangle. Show that, G contains an independent set of size at least n/(triangle + 1).

wurpenxd

wurpenxd

Answered question

2022-09-06

Discrete Math Graph Theory Independent sets
An independent set is a set of vertices in a graph, no two of which are adjacent. Let G be a graph with n vertices and with the maximal degree equal to ∆. Show that, G contains an independent set of size at least n / ( + 1 ).

Answer & Explanation

Yaritza Cardenas

Yaritza Cardenas

Beginner2022-09-07Added 20 answers

Step 1
For any set A, let A ¯ = { x   |   x A  or  x  is adjacent to  A }. Note that
A ¯ = x A { x } ¯
Step 2
Now since any vertex can have at most Δ neighbors, | { x } ¯ | Δ + 1 (where |X| is the cardinality of X). Therefore
| A ¯ | x A | { x } ¯ | x A ( Δ + 1 ) = | A | ( Δ + 1 )
If | A | < n Δ + 1 , then | A ¯ | < n, which means that there is at least one element a G that is not in A ¯ . If A is independent, then so is A { a }. Therefore any independent set can be extended until the set has at least n Δ + 1 independent vertices.

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