I am looking for examples of closed symplectic manifolds $(M,\omega)$ whose Betti numbers do not satisfy a non-decreasing property. Meaning, it fails to satisfy $b_k(M) \leq b_{k+2}(M)$ for some $k < n=\frac{1}{2}\dim M$. (Edit: I've been told in the comments that this property for the Betti numbers is also called unimodal). It is possible there are not any known examples but I have not perused the literature enough to be sure.
If $M$ is a Kahler manifold, then a consequence of the Hard Lefschetz theorem shows that $M$ does satisfy this non-decreasing property. Outside of Kahler examples, there are symplectic manifolds which satisfy a Hard Lefschetz property. Lastly, there are also examples of symplectic manifolds which do not satisfy the Hard Lefschetz property but as far as I know, the known examples still satisfy the non-decreasing property.
This question was asked many years ago but the link in the comment leads to an unavailable page: Examples of non-Kahler symplectic manifolds.
