(1) Institut Fourier, UMR 5582, Université de Grenoble 1, BP 74, 38402 Saint Martin d’Hères, France
Abstract:
Suppose π: X → Y is a smooth blow-up along a submanifold Z of Y between complex Fano manifolds X and Y of pseudo-indices iX and iY respectively (recall that iX is defined by iX :=min {−KX·C | C is a rational curve of X}). We prove that if 2 dim (Z) < dim (Y)+iY −1 and show that this result is optimal by classifying the ‘boundary’ cases. As expected, these results are obtained by studying rational curves on X and Y.
if 2 dim (Z) < dim (Y)+iY −1 and show that this result is optimal by classifying the ‘boundary’ cases. As expected, these results are obtained by studying rational curves on X and Y.