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The uniqueness problem of meromorphic maps into the complex projective space
In 1921, G. Pólya showed that non-constant meromorphic functions ϕ and ψ of finite genera on the complex plane C are necessarily equal if there are distinct five values a i (1 ≦ i ≦ 5) such that ϕ(z) — a i and ψ(z) — a i have the same …