The Noether inequality for algebraic threefolds (With an Appendix by J\'anos Koll\'ar)
Abstract
We establish the Noether inequality for projective 3-folds. More precisely, we prove that the inequality vol(X)≥ 43pg(X)-103 holds for all projective 3-folds X of general type with either pg(X)≤ 4 or pg(X)≥ 21, where pg(X) is the geometric genus and vol(X) is the canonical volume. This inequality is optimal due to known examples found by M. Kobayashi in 1992.
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