The Error Term in Nevanlinna Theory. Ii
نویسنده
چکیده
Nevanlinna theory [Ne] was created to give a quantitative measure of the value distribution for meromorphic functions, for instance to measure the extent to which they approximate a finite number of points. We view a meromorphic function as a holomorphic map ƒ : C —• P into the projective line. The theory has various higher dimensional analogues, of which we shall later consider maps ƒ : C —• X where X is a projective complex manifold of dimension n . We first deal with the classical case of Nevanlinna with n = 1. Let a G P 1 . By a Weil function associated with a we mean a continuous function
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