Let $X$ be a scheme of finite type over $\mathbb C$. One might be interested in morphisms in the derived category $D(X)$ of coherent sheaves on $X$, that are morphisms $f:E^\bullet\to F^\bullet$ of complexes of vector bundles. However, these are morphisms in $D(X)$, thus not so easy (for me) to handle. I know that when $X$ has enough locally frees, one can choose a representative of $f$ such that $f$ is an actual map of complexes. This was just my motivation for the following question:
When does $X$, i.e. Coh$(X)$, have enough locally frees?
Thanks!