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Let $1 \le \ell < r$ be fixed. If $n$ is large enough and $\mathcal A \subseteq X^{(r)}$ is an $\ell$-intersecting family, then $|\mathcal A| \le \binom{n - \ell}{r - \ell}$.
Let$1 \le \ell < r$ be fixed. If $n$ is large enough and $\mathcal A \subseteq X^{(r)}$ is an $\ell$ -intersecting family, then $|\mathcal A| \le \binom{n - \ell}{r - \ell}$ .
This is Theorem 1.17 in the lecture notes.
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