Log canonical 3-fold complements
Abstract
We expand the theory of log canonical 3-fold complements. We prove that if X→ T is a 3-dimensional contraction of log Calabi-Yau type, then we can find B≥ 0 on X for which (X,B) is log canonical and n(KX+B)T 0, where n is an uniform natural number. This means that every 3-fold of log Calabi-Yau type can be turned into a log Calabi-Yau pair in an effective way.
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