Xiaomei Chen, Peng Jin·2019-03-07·via math.CO updates on arXiv.org
Let $n=2k+1$ be odd with $k\geq3$. In this note, we give two intersecting families with diversity larger than $\sum_{i=k+1}^{2k} \binom {2k}{i}$, which disprove a conjecture of Huang.