On birational boundedness of foliated surfaces
Abstract
In this paper we prove a result on the effective generation of pluri-canonical linear systems on foliated surfaces of general type. Fix a function P: Z≥ 0 Z , then there exists an integer N1>0 such that if (X, F) is a canonical or nef model of a foliation of general type with Hilbert polynomial (X, mK F)=P(m) for all m∈ Z≥ 0, then |mK F| defines a birational map for all m≥ N1. We also prove a Grauert-Riemannschneider type vanishing theorem for foliated surfaces with canonical singularities.
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