On general type varieties admitting global holomorphic forms
Abstract
For all nonsingular projective n-folds V of general type, we prove the existence of Noether type inequalities in the following form: vol(V)≥ an,kh0(Vk)-bn,k where 0< k≤ n, an,k and bn,k are positive constants only depending on n and k. As applications, we prove the minimal volume conjecture for 3-folds of general type with ( O)≠ 2,3 and disclose a new type of lifting principles for the sequence of canonical stability indices for varieties of general type. Finally we prove a theorem about ``strong lifting principle'' on varieties V of general type with q>(V).
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