A dichotomy on Schreier sets

We show that the Schreier sets $\mathcal{S}_{\alpha}\ (\alpha<\omega_1)$ satisfy the following dichotomy property. For every hereditary collection $\cf$ of finite subsets of $\N$, either there exists infinite $M=(m_i)_1^{\infty}\subseteq\N$ such that $\cs_{\alpha}(M)=\{\{m_i:i\in E\}:E\in\cs_{\alpha}\}\subseteq\cf$, or there exist infinite $M=(m_i)_1^{\infty},N\subseteq\N$ such that $\cf[N](M)=\{\{m_i:i\in F\}:F\in\cf \mbox{ and } F\subset N\}\subseteq\cs_{\alpha}$.