Are there known examples of compact complex n-dimensional manifolds with betti numbers $b_1=b_2=b_n=0$ for $n >3$? (The case of $n=3$ is the question of integrable complex structures on homology 6-spheres.)
Compact Complex n-folds with Betti numbers $b_1=b_2=b_n=0$ for $n >3$
Andrew McHugh
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