The algebraic dimension of compact complex threefolds with vanishing second Betti number

Abstract

We investigate compact complex manifolds of dimension three and second Betti number b2(X) = 0. We are interested in the algebraic dimension a(X), which is by definition the transcendence degree of the field of meromorphic functions over the field of complex numbers. The topological Euler characteristic top(X) equals the third Chern class c3(X) by a theorem of Hopf. Our main result is that, if X is a compact 3-dimensional complex manifold with b2(X) = 0 and a(X) > 0, then c3(X) = top(X) = 0, that is, we either have b1(X) = 0, \ b3(X) = 2 or b1(X) = 1, \ b3(X) = 0.

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