Proves canonical map degree ≤72 for such threefolds when p_g>243, with equality only if Albanese fiber is a specific surface of general type with p_g=3, q=0, K_F²=36 and canonical degree 36; improves Cai's prior bound.
Algebraic geometry,
2 Pith papers cite this work. Polarity classification is still indexing.
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UNVERDICTED 2representative citing papers
Proves optimal Kawamata-Miyaoka inequality for terminal Q-Fano threefolds of index >=3 and derives c1^3 < 3 c2 c1 for all such threefolds.
citing papers explorer
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On the canonical degree of a Gorenstein minimal threefold of general type
Proves canonical map degree ≤72 for such threefolds when p_g>243, with equality only if Albanese fiber is a specific surface of general type with p_g=3, q=0, K_F²=36 and canonical degree 36; improves Cai's prior bound.
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Kawamata-Miyaoka-type inequality for $\mathbb Q$-Fano varieties with canonical singularities II: Terminal $\mathbb Q$-Fano threefolds
Proves optimal Kawamata-Miyaoka inequality for terminal Q-Fano threefolds of index >=3 and derives c1^3 < 3 c2 c1 for all such threefolds.