Mathematical Research Letters
Volume 11, Issue 6, November 2004 pp. 833-852.
Minimal 3-folds of small slope and the Noether inequality for canonically polarized 3-foldsAuthors: Meng Chen
Author institution: Fudan University
Summary: Assume that $X$ is a smooth projective 3-fold with ample $K_X$. We study a problem of Miles Reid to prove the inequality $$K_X^3\ge \frac{2}{3}(2p_g(X)-5),$$ where $p_g(X)$ is the geometric genus. This inequality is sharp according to known examples of M. Kobayashi. We also birationally classify arbitrary minimal 3-folds of general type with small slope.
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