Аннотация:
Let $X$ be a complex analytic manifold and $D\subset X$ be a free divisor.
If $D$ is locally quasi-homogeneous, then the logarithmic de Rham complex
associated to $D$ is quasi-isomorphic to $\mathbf R j_\ast (\mathbb
C_{X\setminus D})$, which is a perverse sheaf. On the other hand, the
logarithmic de Rham complex associated to a Koszul-free divisor is
perverse. In this paper, we prove that every locally quasi-homogeneous free
divisor is Koszul free.