The number of cliques of size 4 where all the edges are of the same colour is at most

vestpn

vestpn

Answered question

2022-05-28

The number of cliques of size 4 where all the edges are of the same colour is at most ( n 4 ) 3 5 ..
Let K n be the complete graph on n vertices. Prove that for all integers n 4, we can assign each edge one of 3 colours such that the number of cliques of size 4 where all the edges are of the same colour is at most ( n 4 ) 3 5 ..
Can someone give some hints? I am not able to see the problem.
There are ( n 2 ) edges in K n .

Answer & Explanation

ketHideniw7

ketHideniw7

Beginner2022-05-29Added 6 answers

Step 1
Fix an arbitrary 4-clique and a uniformly chosen edge coloring with at most 3 colors. The clique has ( 4 2 ) = 6 edges, and so the probability that it is monochromatic is 3 / 3 6 .
Step 2
By linearity of expectation, the expected number of monochromatic 4-cliques is ( n 4 ) 3 / 3 6 = ( n 4 ) / 3 5 . So there exists a coloring with at most (and also one with at least) that many monochromatic 4-cliques.

Do you have a similar question?

Recalculate according to your conditions!

New Questions in Discrete math

Ask your question.
Get an expert answer.

Let our experts help you. Answer in as fast as 15 minutes.

Didn't find what you were looking for?