Stabilizers and orbits of smooth functions
Abstract
Let be a smooth function such that . We give a condition on when for arbitrary preserving orientation diffeomorphism such that the function is right equivalent to , i.e. there exists a diffeomorphism such that at . The requirement is that belongs to its Jacobi ideal. This property is rather general: it is invariant with respect to the stable equivalence of singularities, and holds for non-degenerated critical points, simple singularities and many others. We also globalize this result as follows. Let be a smooth compact manifold, a surjective smooth function, the group of diffeomorphisms of , and the group of diffeomorphisms of that have compact support and leave invariant. There are two natural right and left-right actions of and on . Let , , , and be the corresponding stabilizers and orbits of with respect to these actions. Under mild assumptions on we get the following homotopy equivalences and . Similar results are obtained for smooth mappings .
Cite
@article{arxiv.math/0411612,
title = {Stabilizers and orbits of smooth functions},
author = {Sergey Maksymenko},
journal= {arXiv preprint arXiv:math/0411612},
year = {2015}
}
Comments
This is the second version of the paper. Now the cases $P=\mathbb{R}$ and $P=S^1$ considered from unique point of view. In particular, this covers the results of the preprint http://xxx.lanl.gov/math.FA/0503734. Moreover, the role of the condition for a function to belong to its Jacobi ideal is explained