Meng Chen
Published 2002-11-16, updated 2003-05-16Version 5
We study the canonical stability of a smooth projective 3-fold $V$ of general type. We prove that (1) $|5K_V|$ gives a birational map onto its image provided the geometric genus $p_g\geq 4$; (2) $|6K_V|$ gives a birational map provided $p_g=3$. Known examples show that both are optimal. This fact can be viewed as parallel to surface case, though people know very little on 3-folds of general type with $p_g\leq 1$.
Comments: Latex 14 pages, the final version, to appear in International Journal of Mathematics
Journal: International Journal of Math. 14(2003), 515-528
Inequalities of Noether type for 3-folds of general type
The 5-canonical system on 3-folds of general type
Bloch-type conjectures and an example of a threefold of general type
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