GIT Stability of Henon Maps
Abstract
In this paper we study the locus of generalized degree d Henon maps in the parameter space RatdN of degree d rational maps PNN modulo the conjugation action of SLN+1. We show that Henon maps are in the GIT unstable locus if N3 or d3, and that they are semistable, but not stable, in the remaining case of N=d=2. We also give a general classification of all unstable maps in Rat22.
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