How to prove p ( x ) &#x2265;<!-- ≥ --> m 2 </msup> <mrow class=

rose2904ks

rose2904ks

Answered question

2022-06-19

How to prove p ( x ) m 2 / 4
Let F be a family of m subsets of a finite set X. For x X, let p(x) be the number of pairs (A,B) of sets A , B F such that either x A B or x A B. Prove that p ( x ) m 2 / 2.
In the book I'm studying, writer has written the following hint:
Hint: Let d(x) be the degree of x in F , and observe that p ( x ) = d ( x ) 2 + ( m d ( x ) ) 2 .
I was wondering if someone could help me about my problem. Thanks in advance.

Answer & Explanation

Zayden Andrade

Zayden Andrade

Beginner2022-06-20Added 22 answers

Step 1
Well m 2 = p ( x ) + ( m 2 p ( x ) ) so either p ( x ) m 2 / 2 or m 2 p ( x ) > m 2 / 2. Notice that the hint implies(or the way you solve it by counting) that m 2 p ( x ) = 2 d ( x ) ( m d ( x ) ) why?
Step 2
We want to show that it is not possible that 2 d ( x ) ( m d ( x ) ) > m 2 / 2 can you factor the whole expression in a nice way?

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