Estimates of the number of rational mappings from a fixed variety to varieties of general type
Abstract
First we find effective bounds for the number of dominant rational maps f:X → Y between two fixed smooth projective varieties with ample canonical bundles. The bounds are of the type \A · KXn\\B · KXn\2, where n=dimX, KX is the canonical bundle of X and A,B are some constants, depending only on n. Then we show that for any variety X there exist numbers c(X) and C(X) with the following properties: For any threefold Y of general type the number of dominant rational maps f:X Y is bounded above by c(X). The number of threefolds Y, modulo birational equivalence, for which there exist dominant rational maps f:X Y, is bounded above by C(X). If, moreover, X is a threefold of general type, we prove that c(X) and C(X) only depend on the index rXc of the canonical model Xc of X and on KXc3.
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