The Maurey-Pisier theorem states that if $p_X$ is the supremum of those $p$ such that the Banach space $X$ has Rademacher type $p$, then $\ell_{p_X}$ is finitely representable in $X$.
For $1\leq p<\infty$, let us say the Schauder basis $(e_i)_{i=1}^\infty$ has \emph{block type} $p$ if there exists a constant $C$ such that for any natural number $n$, any $0=k_0<\ldots <k_n$, any scalars $(a_i)_{i=1}^{k_n}$, if $y_i=\sum_{j=k_{i-1}+1}^{k_i} a_je_j$, \begin{equation}\bigl(\int_0^1 \|\sum_{i=1}^n r_i(t)y_i\|^pdt\bigr)^{1/p} \leq C \bigl(\sum_{i=1}^n \|y_i\|^p\bigr)^{1/p}.\end{equation} Here, $(r_i)_{i=1}^\infty$ is the sequence of Rademacher functions on $[0,1]$.
This definition was given on page 24 of the article "Infinite dimensional geometric moduli and type-cotype theory" by V.D. Milman and A Perelson, in the book "Geometric Aspects of Banach Spaces: Essays in Honour of Antonio Plans."
My question, which doesn't seem to be directly stated in that article, is does the block version of the Maurey-Pisier theorem hold:
$Q:$ Is it true that, if $p_X$ is the supremum of those $p\in [1,\infty)$ such that the basis $(e_i)$ has block type $p$, $\ell_{p_X}$ is block finitely representable in $(e_i)$?
The article of Milman and Perelson references "the variant of Maurey-Pisier's theorem for blocks of a given sequence as it was done, for example, in [MSch2]." However, in the bibliography of that article, there is no [MSch2] entry. I have looked through some of the bibliography items listed in that article, but I am unable to find anywhere a definitive answer to the question $Q$.
