论文信息 - Rational surfaces in index-one Fano hypersurfaces

Rational surfaces in index-one Fano hypersurfaces

We give the first evidence for a conjecture that a general, index-one, Fano hypersurface is not unirational: (i) a general point of the hypersurface is contained in no rational surface ruled, roughly, by low-degree rational curves, and (ii) a general point is contained in no image of a Del Pezzo surface.

Roya Beheshti | J. Starr

[1] A. J. Jong,et al. Cubic fourfolds and spaces of rational curves , 2004 .

[2] J. Starr,et al. Quot Functors for Deligne-Mumford Stacks , 2002, math/0204307.

[3] J. Kollár. Which are the simplest algebraic varieties , 2001 .

[4] W. Fulton,et al. Notes on stable maps and quantum cohomology , 1996, alg-geom/9608011.

[5] T. Willmore. Algebraic Geometry , 1973, Nature.

[6] Ju. Manin,et al. THREE-DIMENSIONAL QUARTICS AND COUNTEREXAMPLES TO THE LÜROTH PROBLEM , 1971 .

[7] Phillip A. Griffiths,et al. On the Periods of Certain Rational Integrals: II , 1969 .

[8] Takehiko Yasuda,et al. HIGHER DIMENSIONAL ALGEBRAIC GEOMETRY , 2006 .

[9] F. Campana,et al. Connexité rationnelle des variétés de Fano , 1992 .

[10] J. Kollár,et al. Rational connectedness and bound-edness of Fano manifolds , 1992 .