Mathematics – Classical Analysis and ODEs
Scientific paper
2006-01-05
J. Math. Anal. Appl. 328 (2007), 1141-1151
Mathematics
Classical Analysis and ODEs
AMS-LaTeX, 10 pages
Scientific paper
Let $ f$ be a real-analytic function germ whose critical locus contains a given real-analytic set $ X $, and let $ Y $ be a germ of closed subset of $ \mathbb{R}^n $ at the origin. We study the stability of $ f $ under perturbations $ u $ that are flat on $ Y $ and that belong to a given Denjoy-Carleman non-quasianalytic class. We obtain a condition ensuring that $ f+u=f\circ\Phi $ where $ \Phi $ is a germ of diffeomorphism whose components belong to a (generally larger) Denjoy-Carleman class. Roughly speaking, this condition involves a \L ojasiewicz-type separation property between $ Y $ and the complex zeros of a certain ideal associated with $ f $ and $ X $. The relationship between the Denjoy-Carleman classes of $ u$ and $ \Phi $ is controlled precisely by the inequality. This result extends, and simplifies, former work of the author on germs with isolated critical points.
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