抄録
It is known that if X is an n-dimensional normal variety, and D a nef and big Cartier divisor on it such that the associated map φD is generically finite then Dn≥2(h0(X, \mathcal{O}X(D))−n). We study the case in which the equality holds for n=3 and D=KX is the canonical divisor.
We also produce a bound for the admissible degree of the canonical map of a threefold, when it is supposed to be generically finite.
