The Noether inequality for threefolds and three moduli spaces with minimal volumes

Abstract

We establish the Noether inequality \[Vol(X)≥ 43pg(X)-103\] for all projective 3-folds X of general type with geometric genus 5≤ pg(X)≤ 10 where Vol(X) is the canonical volume. This result resolves all remaining cases of the Noether inequality for 3-folds. We further investigate the moduli spaces of canonical 3-folds with small genera and minimal volumes. For a 3-fold of general type with geometric genus 2 and with minimal canonical volume 13, we prove that its canonical model is a hypersurface of degree 16 in P(1,1,2,3,8), which gives an explicit description of its canonical ring. This implies that the coarse moduli space M13, 2, parametrizing all canonical 3-folds with canonical volume 13 and geometric genus 2, is an irreducible unirational variety of dimension 189. Parallel studies show that M1, 3 is irreducible, unirational, and 236-dimensional, and that M2, 4 is irreducible, unirational, and 270-dimensional. As being conceived, every member in these 3 families is simply-connected.

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