Post-Critically Finite Maps on Pn for n2 are Sparse
Abstract
Let f: Pn Pn be a morphism of degree d2. The map f is said to be post-critically finite (PCF) if there exist integers k1 and 0 such that the critical locus Critf satisfies fk+(Critf)⊂eqf(Critf). The smallest such is called the tail-length. We prove that for d3 and n2, the set of PCF maps f with tail-length at most 2 is not Zariski dense in the the parameter space of all such maps. In particular, maps with periodic critical loci, i.e., with =0, are not Zariski dense.
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