As the title suggests, I have the following question:
Is there a compact complex manifold with $b_1(X)=b_2(X)=b_3(X)=b_4(X)=0$?
Clarification:
Denote by $b_k$ the $k$th Betti number of a compact complex manifold of positive dimension.
Is there a compact complex manifold with $b_1(X)=b_2(X)=b_3(X)=b_4(X)=0$?
ag.algebraic-geometrydg.differential-geometryat.algebraic-topologycomplex-geometrycv.complex-variables
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