Structural stability of hyperbolic Henon maps
by
Greg Buzzard
Purdue University
Coauthors: Adrian Jenkins

For C¹ diffeomorphisms of a compact manifold, the structural stability theorem implies that structural stability is equivalent to Axiom A plus the strong transversality condition. We prove an analog of one direction of this equivalence in the case of complex Henon maps: hyperbolicity implies global structural stability. The proof uses ideas of Robinson from the smooth case as well as holomorphic motions in one variable glued together to give a holomorphic motion in two dimensions.

Date received: February 22, 2008