A uniqueness theorem for meromorphic maps into Pn with generic (2n+2) hyperplanes
Abstract
Let H1,…,H2n+2 be generic (2n+2) hyperplanes in Pn. It is proved that if meromorphic maps f and g of Cm into Pn satisfy f*(Hj)=g*(Hj) (1≤ j≤ 2n+2) and g is algebraically non-degenerate then f=g. This result is essentially implied by the proof of Hirotaka Fujimoto in papers [Nagoya Math. J., 1976(64): 117--147] and [Nagoya Math. J., 1978(71): 13--24]. This note gives a complete proof of the above uniqueness result.
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