Characterization of the 4-canonical birationality of algebraic threefolds

Abstract

In this article we present a 3-dimensional analogue of a well-known theorem of E. Bombieri (in 1973) which characterizes the bi-canonical birationality of surfaces of general type. Let X be a projective minimal 3-fold of general type with Q-factorial terminal singularities and the geometric genus pg(X) 5. We show that the 4-canonical map φ4 is not birational onto its image if and only if X is birationally fibred by a family C of irreducible curves of geometric genus 2 with KX· C0=1 where C0 is a general irreducible member in C.

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