We prove that flag versions of quiver Grassmannians (also knows as Lusztig's fibers) for Dynkin quivers (types $A$, $D$, $E$) have no odd cohomology over $\mathbb{Z}$. Moreover, for types $A$ and $D$ we prove that these varieties have $\alpha$-partitions into affine spaces. We also show that to prove the same statement for type $E$, it is enough to check this for indecomposable representations. We also give a flag version of the result of Irelli-Esposito-Franzen-Reineke on rigid representations: we prove that flag versions of quiver Grassmannians for rigid representations have a diagonal decomposition. In particular, they have no odd cohomology over $\mathbb{Z}$.