Holomorphic Approximation of Symplectic Diffeomorphisms for Calogero--Moser Spaces
Abstract
The real Calogero--Moser space CnR is a noncompact, totally real submanifold of the complex Calogero--Moser space Cn. We prove that every symplectic diffeomorphism of CnR smoothly isotopic to the identity can be approximated in the fine Whitney topology -- the strongest in this context -- by holomorphic symplectic automorphisms of Cn that preserve CnR. A key ingredient in our proof is a refined version of the symplectic density property of Cn.
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