Two meromorphic mappings having the same inverse images of moving hyperplanes

Abstract

In this paper, we will show that if two meromorphic mappings f and g of Cm into Pn( C) have the same inverse images for (2n+2) moving hyperplanes \ai\i=12n+2 with multiplicities counted to level l0 then the map f× g must be algebraically degenerated over the field R\ai\i=12n+2, where l0=3n3(n+1)q(q-2) with q=2n+2n+2. Our result generalizes the previous result for fixed hyperplanes case of Fujimoto and also improves his result by giving an explicit estimate for the number l0.