Extension of Fujimoto's uniqueness theorems
Abstract
Hirotaka Fujimoto considered two meromorphic maps f and g of Cm into Pn such that f*(Hj)=g*(Hj) ( 1≤ j≤ q ) for q hyperplanes Hj in Pn in general position and proved f=g under suitable conditions. This paper considers the case where f is into Pn and g is into PN and gives extensions of some of Fujimoto's uniqueness theorems. The dimensions N and n are proved to be equal under suitable conditions. New and interesting phenomena also occur.
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