Value Distribution Theory for Meromorphic Maps |
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Contents
Introduction | 1 |
B Value Distribution Theory for Moving Targets | 56 |
Hermitian Geometry | 92 |
Copyright | |
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Abbreviate Ahlfors Estimates analytic subset analytically independent associated maps Assume that f compensation function complex manifold constant dd log defect relation defined dual base exists exterior product fibers FMTH form of bidegree Formula free of order Frenet frames Gp(V Gq(V Hence hermitian metric hermitian vector space holomorphic form holomorphic function holomorphic map holomorphic section hyperplane section hyperplane section bundle implies integral Let f line bundle linear subspace linearly non-degenerate log Y(r manifold of dimension map f Math meromorphic functions meromorphic map Nevanlinna theory non-negative obtain P(A V P(AV parabolic exhaustion parabolic manifold position PROOF proved reduced representation representation of f representation section Second Main Theorem set of meromorphic space of dimension supp Take Tf r,s valence function value distribution theory zero divisor λε μλ