Description |
I will give 3 proofs for showing, There exists a family of subsets \mathfrak{F}, of \{ \cdots n\}, * such that each element A \in \mathfrak{F} is of size \frac{n}{4} * for any pair A,B \in \mathfrak{F},\ |A \cap B| \leq \frac{n}{8}, * and |\mathfrak{F}| = 2^{\Omega(n)} |
Organised by | John Barretto |
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