Unstability problem of real analytic maps
Abstract
As well-known, the C∞ stability of proper C∞ maps is characterized by the infinitesimal C∞ stability. In the present paper we study the counterpart in real analytic context. In particular, we show that the infinitesimal Cω stability does not imply Cω stability; for instance, a Whitney umbrella R2 R3 is not Cω stable. A main tool for the proof is a relative version of Whitney's Analytic Approximation Theorem which is shown by using H. Cartan's Theorems A and B.
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