On the rationality of certain Fano threefolds

Abstract

In this paper I study the rationality problem for Fano threefolds X⊂ p+1 of genus p, that are Gorenstein, with at most canonical singularities. The main results are: (1) a trigonal Fano threefold of genus p is rational as soon as p≥ 8 (this result has already been obtained in PCS, but we give here an independent proof); (2) a non--trigonal Fano threefold of genus p≥ 7 containing a plane is rational; (3) any Fano threefold of genus p≥ 17 is rational; (4) a Fano threefold of genus p≥ 12 containing an ordinary line in its smooth locus is rational.