Abstract
A normal projective complex surface is called a rational homology projective plane if it has the same Betti numbers with the complex projective plane C P 2 \mathbb {C}\mathbb {P}^2 . It is known that a rational homology projective plane with quotient singularities has at most 5 5 singular points. So far all known examples have at most 4 4 singular points. In this paper, we prove that a rational homology projective plane S S with quotient singularities such that K S K_S is nef has at most 4 4 singular points except one case. The exceptional case comes from Enriques surfaces with a configuration of 9 smooth rational curves whose Dynkin diagram is of type 3 A 1 ⊕ 2 A 3 3A_1 \oplus 2A_3 . We also obtain a similar result in the differentiable case and in the symplectic case under certain assumptions which all hold in the algebraic case.
Accepted Version
Published Version
Talk to us
Join us for a 30 min session where you can share your feedback and ask us any queries you have
Schedule a call