Minimal and maximal p-operator space structures

We show that $L^\infty(\mu)$, in its capacity as multiplication operators on $L^p(\mu)$, is minimal as a $p$-operator space for a decomposable measure $\mu$. We conclude that $L^1(\mu)$ has a certain maximal type $p$-operator space structure which facilitates computations with $L^1(\mu)$ and the projective tensor product.