Given a lower semicontinuous function $f : \R^n \rightarrow \R \cup \{+\infty\}$, we prove that the set of points of $\R^n$ where the lower Dini subdifferential has convex dimension $k$ is countably $(n-k)$-rectifiable. In this way, we extend a theorem of Benoist(see [1, Theorem 3.3]), and as a corollary we obtain a classical result concerning the singular set of locally semiconcave functions.