A gap theorem for minimal log discrepancies of non-canonical singularities in dimension three

Abstract

We show that there exists a positive real number δ>0 such that for any normal quasi-projective Q-Gorenstein 3-fold X, if X has worse than canonical singularities, that is, the minimal log discrepancy of X is less than 1, then the minimal log discrepancy of X is not greater than 1-δ. As applications, we show that the set of all non-canonical klt Calabi-Yau 3-folds are bounded modulo flops, and the global indices of all klt Calabi-Yau 3-folds are bounded from above.