On varieties of maximal Albanese dimension

Abstract

Let f: X Y be a surjective morphism of smooth n-dimensional projective varieties, with Y of maximal Albanese dimension. Hacon and Pardini studied the structure of f assuming Pm(X)=Pm(Y) for some m≥ 2. We extend their result by showing that, under the above assumtions, f is birationally equivalent to a quotient by a finite abelian group. We also study the pluricanonical map of varieties of maximal Albanese dimesnion. The main result is that the linear series |5KX| incuces the Iitaka model of X.